Connectome Inspired Neural Network

A Comprehensive Guide to Connectome-Based Modeling (2015-2025)
From complete EM reconstructions to predictive mechanistic models bridging structure and function

📑 Table of Contents

📚 Paper Collections by Organism

🪰 Drosophila
👤 Human
🐵 Monkey
🐭 Rodent
🪱 C. Elegans
🧬 Theory-Based
🔬 Others

🔬 Detailed Analysis of Connectome-Based Modeling

🪰 Drosophila Models (Full EM Connectome)

⭐️ Turaga et al., 2024 - Landmark Study
Single-neuron prediction (r=0.7-0.9) from FlyWire connectome
Fiete et al., 2025 - Massive Parameter Reduction
439 neurons → 57 parameters via cell-type constraints
Borst, 2024 - Temporal Filtering
Conductance-based optic lobe model
Full Brain LIF Model
140K neurons whole-brain sensorimotor processing

🪱 C. elegans Models (First Complete Connectome)

⭐️ Zhao et al., 2024 - Most Comprehensive
Brain-body-environment closed loop with full biophysics
Morrison & Young, 2025 - Premotor Circuit
Data-driven fit to calcium imaging
Creamer, Leifer & Pillow, 2024 - Theoretical Analysis
Quantifies connectome insufficiency

🐭 Mouse/Rat Models (Partial EM + Statistical)

MICrONS Consortium - Structure-Function Dataset
100K neurons with co-registered EM and functional data
Tolias et al., 2025 - Foundation Model
Transformer-based neural activity prediction
Rajan et al., 2020 - CURBD Method
Inferring effective connectivity from dynamics
⭐️ Blue Brain Project, 2015 - Mammalian Landmark
First mammalian cortical simulation (31K neurons, statistical)
⭐️ Billeh et al., 2020 - Allen V1 Model
230K neurons with hybrid neuron models
Potjans & Diesmann, 2014 - Canonical Circuit
Benchmark cortical microcircuit model

🧬 Theory & Principles

Beiran & Litwin-Kumar - Theoretical Limits
Connectome alone has prediction floor
General Principles Across Species
- Principle 1: Connectome Constrains Dynamics (Partially)
- Principle 2: Cell-Type-Level Parameterization
- Principle 3: Emergent Computation
- Principle 4: Recurrent Amplification
- Principle 5: Inhibitory Diversity
The "Connectome Ladder"
4 levels of modeling abstraction

Paper Collections by Organism

Drosophila

Connectome-constrained deep mechanistic networks predict neural responses across the fly visual system at single-neuron resolution
https://www.nature.com/articles/s41586-024-07939-3 Srinivas C. Turaga
!!!
Previous work: A Connectome Based Hexagonal Lattice Convolutional Network Model of the Drosophila Visual System
One-to-one mapping between deep network units and real neurons uncovers a visual population code for social behavior
Jonathan W. Pillow, Mala Murthy
The connectome predicts resting-state functional connectivity across the Drosophila brain
A Drosophila computational brain model reveals sensorimotor processing Here we create a leaky integrate-and-fire computational model of the entire Drosophila brain, on the basis of neural connectivity and neurotransmitter identity.
Limitation: We assume each neuron is either exclusively inhibitory or excitatory. We ignore neural morphology and receptor dynamics. The underlying synapses or neurotransmitter predictions may not be fully accurate. Gap junctions cannot be identified in the electron microscopy dataset, so we ignore their possibility.
From Synapses to Dynamics: Obtaining Function from Structure in a Connectome Constrained Model of the Head Direction Circuit Ila Fiete, 2025

\tau \frac{d x_j^A(t)}{d t}=-\ell x_j^A(t)+\sigma\left(\sum_{B \in \mathcal{C}} \sum_k w_0\left(1+Z^{A B}\right) s g n^B C_{j k} x_k^B(t)+b^A+u_j(t)\right)

reduces the number of optimized parameters from $439^{2} +439+1 = 193, 161$ to just $7^{2} +7+1 = 57$ parameters Total Loss: Linear Consistency Loss, Stability Loss, Minimum Speed Loss, Entropy Loss, L1 and L2 Regularization

Differential temporal filtering in the fly optic lobe Alexander Borst Taking advantage of the known connectome I simulate a network of five adjacent optical columns each comprising 65 different cell types. Each neuron is modeled as an electrically compact single compartment, conductance-based element that receives input from other neurons within its column and from its neighboring columns according to the intra- and inter-columnar connectivity matrix.
NeuroMechFly v2: simulating embodied sensorimotor control in adult Drosophila Sibo Wang-Chen, Victor Alfred Stimpfling, Thomas Ka Chung Lam, Pembe Gizem Özdil, Louise Genoud, Femke Hurtak & Pavan Ramdya, 2024, Nature Methods
Whole-body physics simulation of fruit fly locomotion Roman Vaxenburg, Igor Siwanowicz, Josh Merel, Alice A. Robie, Carmen Morrow, Guido Novati, Zinovia Stefanidi, Gert-Jan Both, Gwyneth M. Card, Michael B. Reiser, Matthew M. Botvinick, Kristin M. Branson, Yuval Tassa & Srinivas C. Turaga, 2025, Nature
A neural algorithm for a fundamental computing problem Fly brain inspires computing algorithm 2017, Science Flies use an algorithmic neuronal strategy to sense and categorize odors. Dasgupta et al. applied insights from the fly system to come up with a solution to a computer science problem. On the basis of the algorithm that flies use to tag an odor and categorize similar ones, the authors generated a new solution to the nearest-neighbor search problem that underlies tasks such as searching for similar images on the web.
Infrequent strong connections constrain connectomic predictions of neuronal function Timothy A. Currier, Thomas R. Clandinin

Raw imaging data, relevant connectome data, and partially processed visual responses for all 571 ROIs are available on Dryad: https://datadryad.org/dataset/doi:10.5061/dryad.pg4f4qs1j
https://datadryad.org/dataset/doi:10.5061/dryad.bnzs7h4ns https://datadryad.org/dataset/doi:10.5061/dryad.kh18932k1

Human

Learning Dynamic Graph Representation of Brain Connectome with Spatio-Temporal Attention
Byung-Hoon Kim, Jong Chul Ye, Jae-Jin Kim
NeurIPS 2021 Poster
A Prefrontal Cortex-inspired Architecture for Planning in Large Language Models
Ida Momennejad
BrainGNN: Interpretable Brain Graph Neural Network for fMRI Analysis
sinergia connectomics summer school
Connectome-Based Attractor Dynamics Underlie Brain Activity in Rest, Task, and Disease
Enhancer-driven cell type comparison reveals similarities between the mammalian and bird pallium
A Large-Scale Model of the Functioning Brain Daniel Rasmussen, 2012, Science

Perturbation

monkey

Compact deep neural network models of visual cortex
Jonathan W. Pillow, Matthew A. Smith

Rodent

Inferring brain-wide interactions using data-constrained recurrent neural network models
Kanaka Rajan, Mount Sinai
RNN
- CURBD allows the total activity of each region to be decomposed into a set of source currents from all other regions

MICrONS

Functional connectomics spanning multiple areas of mouse visual cortex
The MICrONS Consortium

Foundation model of neural activity predicts response to new stimulus types Andreas S. Tolias
Functional connectomics reveals general wiring rule in mouse visual cortex Andreas S. Tolias

C. Elegans

Elegans-AI: How the connectome of a living organism could model artificial neural networks
Francesco Bardozzo, Andrea Terlizzi, Claudio Simoncini, Pietro Lió, Roberto Tagliaferri
Deep connectomics networks: Results from neural network architectures inspired from network neuroscience
Nicholas Roberts, Vinay Uday Prabhu
ICML Deep Phenomena 2019
Deep Connectomics Networks: Neural Network Architectures Inspired by Neuronal Networks
Nicholas Roberts, Dian Ang Yap, Vinay Uday Prabhu
Real Neurons & Hidden Units @ NeurIPS 2019 Poster
C. Elegans and the mouse visual cortex
Biological connectomes as a representation for the architecture of artificial neural networks
Samuel Schmidgall, Catherine Schuman, Maryam Parsa
ICLR 2023 Conference Withdrawn Submission
A machine learning toolbox for the analysis of sharp-wave ripples reveals common waveform features across species
Analysis toolbox
Learning dynamic representations of the functional connectome in neurobiological networks
Connectome-constrained Latent Variable Model of Whole-Brain Neural Activity
Lu Mi, .., Srinivas C Turaga
An integrative data-driven model simulating C. elegans brain, body and environment interactions Nature Computational Science, 2024 Neuron models (Neurons were modeled by morphologically derived multicompartmental models with somatic Hodgkin–Huxley dynamics and passive neurites) + Graded synapse and gap junction models:
A data-driven biophysical network model reproduces C. elegans premotor neural dynamics Megan Morrison, Lai-Sang Young
Bridging the gap between the connectome and whole-brain activity in C. elegans Matthew S. Creamer, Andrew M. Leifer, Jonathan W. Pillow, 2024

Dataset

Neural signal propagation atlas of Caenorhabditis elegans

Theory-Based

Learning to Learn with Feedback and Local Plasticity
Real Neurons & Hidden Units @ NeurIPS 2019 Oral
Jack Lindsey, Columbia University
The Simplest Neural Model and a Hypothesis for Language
Daniel Mitropolsky, Columbia University
Prediction of neural activity in connectome-constrained recurrent networks
Manuel Beiran, Ashok Litwin-Kumar
- Is the connectome insufficient to constrain the dynamics?
Connectivity Structure and Dynamics of Nonlinear Recurrent Neural Networks
Spatially embedded recurrent neural networks reveal widespread links between structural and functional neuroscience findings
Geometric Scaling Law in Real Neuronal Networks
Gang Yan

cognitive inspired

TopoNets: High performing vision and language models with brain-like topography

the following arecollected by Ruizhe Zhou

Bridging the data gap between children and large language models
Frank, M. C. (2023)
Cognitive science in the era of artificial intelligence: A roadmap for reverse-engineering the infant language-learner
Dupoux, E. (2018)
Findings of the BabyLM Challenge: Sample-Efficient Pretraining on Developmentally Plausible Corpora
Warstadt, A. et al. (2023)
MEWL: Few-shot multimodal word learning
Jiang, G. et al. (2023)
Lexicon-Level Contrastive Visual-Grounding Improves Language Modeling
Zhuang, C. et al. (2024)
Visual Grounding Helps Learn Word Meanings in Low-Data Regimes
Zhuang, C. et al. (2023)
Context Limitations Make Neural Language Models More Human-Like
Kuribayashi, T. et al. (2022)
Does Vision Accelerate Hierarchical Generalization in Neural Language Learners?
Kuribayashi, T. (2023)
Emergent Word Order Universals from Cognitively-Motivated Language Models Tatsuki Kuribayashi, Ryo Ueda, Ryo Yoshida, Yohei Oseki, Ted Briscoe, Timothy Baldwin

Others

potential model

Piecewise quadratic neuron model: A tool for close-to-biology spiking neuronal network simulation on dedicated hardware

Basic Architecture

Exploring Randomly Wired Neural Networks for Image Recognition
Saining Xie, Alexander Kirillov, Ross Girshick, Kaiming He
Optimal structure and parameter learning of Ising models

Review

Researcher (TODO)

Andreas Horn

Detailed Analysis of Connectome-Based Modeling Approaches

Overview

This section provides in-depth analysis of key papers that leverage connectome data to build computational models of neural circuits and whole brains. We focus on three model organisms with complete or near-complete connectomes: Drosophila melanogaster, Caenorhabditis elegans, and Mouse, examining how structural connectivity constrains and predicts neural dynamics and behavior.

🪰 Drosophila Connectome-Based Models

1. Turaga et al., 2024 - Connectome-Constrained Deep Mechanistic Networks ⭐️ Landmark Study

Journal: Nature (2024)
Authors: Srinivas C. Turaga et al.
Link: https://www.nature.com/articles/s41586-024-07939-3

This is arguably the most sophisticated connectome-constrained neural network model to date, achieving single-neuron resolution predictions across the entire fly visual system.

Background & Motivation

The Challenge:

The fly visual system contains ~60,000 neurons with complex dendritic computations
Traditional models either lack biological detail or don't scale to whole-system predictions
Need to bridge the gap between connectome structure and functional responses

Innovation:

First model to combine full connectome connectivity with mechanistic neuron models at scale
Achieves single-neuron prediction accuracy comparable to experimental noise levels
Demonstrates that connectome + neuron biophysics can predict neural responses to natural stimuli

Connectome Data Utilization

Data Sources:

FlyWire connectome: Full adult fly brain EM reconstruction (~140,000 neurons, 50M+ synapses)
Optic lobe focus: ~60,000 neurons in visual pathways (lamina, medulla, lobula, lobula plate)
Synapse-level connectivity: Individual chemical synapses with spatial locations
Cell type annotations: ~200 cell types with morphological and functional labels

Connectivity Matrix Construction:

Directed graph: $C_{ij}$ = number of synapses from neuron $j$ to neuron $i$
Spatial information: synapse locations on dendrites preserved
Sign information: Neurotransmitter predictions (excitatory: acetylcholine, glutamate; inhibitory: GABA)

Model Architecture

Hierarchical Structure:

Visual Input → Photoreceptors → Lamina → Medulla → 
Lobula/Lobula Plate → Visual Projection Neurons

Neuron Model (Mechanistic Point Neuron):

For each neuron $i$ :

\tau_i \frac{dV_i}{dt} = -V_i + \sum_{j} w_{ij} \cdot f(V_j) + I_i^{\text{input}}

Where:

$V_i$ : Membrane potential (or activity) of neuron $i$
$\tau_i$ : Time constant (cell-type specific)
$w_{ij}$ : Synaptic weight from neuron $j$ to $i$ (initialized from connectome)
$f(\cdot)$ : Nonlinear activation function (rectification, saturation)
$I_i^{\text{input}}$ : External sensory input (for photoreceptors)

Key Mechanistic Features:

Dendritic compartmentalization: Neurons divided into dendritic "sectors" based on anatomy
Nonlinear dendritic integration: Each sector has local nonlinearity before pooling
Temporal filtering: Cell-type specific time constants ( $\tau$ )
Synaptic dynamics: Short-term plasticity (depression, facilitation) for some synapses

Depth: Effectively 5-8 layers deep (from photoreceptors to output neurons)

Parameter Optimization Strategy

Two-Stage Optimization:

Stage 1: Connectome Initialization

Synaptic weights $w_{ij}$ initialized proportionally to synapse counts: $w_{ij} \propto C_{ij}$
Sign determined by neurotransmitter prediction
Spatial structure preserved (which dendrite receives the synapse)

Stage 2: Data-Driven Refinement

Free Parameters (~10,000-100,000 parameters for 60,000 neurons):

Per-cell-type parameters (~200 cell types):
- Time constants $\tau_{\text{type}}$
- Gain factors for synaptic weights
- Activation function parameters (threshold, slope, saturation)
- Dendritic nonlinearity strength
Individual neuron parameters (for a subset):
- Baseline activity offsets
- Dendritic sector weights

Optimization Method:

Gradient descent via backpropagation through time (BPTT)
Loss function: Mean squared error between predicted and recorded neural responses $\mathcal{L} = \frac{1}{N} \sum_{i=1}^{N} \sum_{t} \left( V_i^{\text{pred}}(t) - V_i^{\text{exp}}(t) \right)^2$
Regularization:
- L2 penalty on parameter deviations from connectome-based initialization
- Encourages parameters to stay biologically plausible
- Prevents overfitting to training stimuli

Training Data:

Two-photon calcium imaging from thousands of neurons
Stimuli: Moving edges, gratings, natural scenes, looming objects
~100 neurons simultaneously recorded, dataset aggregated across experiments

Computational Cost:

GPU-accelerated simulation (JAX framework)
Training time: ~Days on multi-GPU cluster
Real-time simulation capability after training

Validation & Results

Predictive Performance:

Single-neuron predictions: Correlation $r \approx 0.7-0.9$ with held-out data
Across cell types: Accurate predictions for all major visual neuron types (T4/T5, Tm, LC neurons, etc.)
Novel stimuli generalization: Model predicts responses to stimuli not in training set
Population-level statistics: Maintains biologically realistic response distributions

Key Findings:

Connectome is highly constraining:
- Connectivity structure alone predicts ~60-70% of response variance
- Remaining variance explained by cell-type specific parameters
Dendritic nonlinearities are essential:
- Linear models fail dramatically
- Local dendritic computations critical for direction selectivity (T4/T5 neurons)
Emergent computations:
- Motion detection emerges from connectome + local nonlinearities
- Matched the Hassenstein-Reichardt correlator model mechanistically
Cell type diversity:
- Different cell types require different time constants and nonlinearities
- Consistent with known biophysical differences (e.g., graded vs. spiking)

Comparison to Previous Approaches

Approach	Turaga 2024	Traditional CNNs	Detailed Compartmental Models
Biological Connectivity	Full connectome	Hand-designed	Single neuron
Scale	60,000 neurons	N/A	1 neuron
Neuron Model	Mechanistic point neuron	Abstract units	Full HH
Prediction Accuracy	High	Low (wrong neurons)	High (1 neuron)
Interpretability	High	Low	High
Computational Cost	Moderate	Low	Very High

Significance & Impact

Scientific Impact:

Proof of principle: Connectomes can predict neural activity at single-neuron resolution
Mechanistic understanding: Reveals how structure gives rise to function
Benchmarking: Sets standard for connectome-based modeling

Technical Impact:

Scalability: Shows deep learning + biophysics can scale to whole brain regions
Framework: Provides blueprint for other organisms (mouse, human)
Data integration: Demonstrates how to combine connectomics, imaging, and modeling

Limitations:

Still uses simplified neuron models (no detailed dendrites for all neurons)
Requires large-scale functional data for optimization
Gap junctions not fully incorporated
Plasticity and learning not included

2. Fiete et al., 2025 - Head Direction Circuit with Massive Parameter Reduction

Journal: bioRxiv (2025)
Authors: Ila Fiete et al.
Title: From Synapses to Dynamics: Obtaining Function from Structure in a Connectome Constrained Model

The Parameter Reduction Problem

Traditional Approach:

Head direction circuit: 439 neurons
Fully connected RNN would require: $439^2 + 439 + 1 = 193,161$ parameters
Impossible to constrain from available data

Connectome-Constrained Approach:

Reduce to only 57 parameters (3,384× reduction!)
Achieved by leveraging connectome structure

Model Formulation

Connectome-Constrained Dynamics:

\tau \frac{d x_j^A(t)}{d t}=-\ell x_j^A(t)+\sigma\left(\sum_{B \in \mathcal{C}} \sum_k w_0\left(1+Z^{A B}\right) \text{sgn}^B C_{j k} x_k^B(t)+b^A+u_j(t)\right)

Parameter Structure:

$C_{jk}$ : Fixed connectome matrix (from FlyWire)
$\text{sgn}^B$ : Fixed sign (excitatory/inhibitory) for cell type $B$
$Z^{AB}$ : Learnable cell-type-to-cell-type coupling strength (7×7 matrix)
$w_0$ : Global synaptic weight scale
$b^A$ : Baseline activity for cell type $A$
$\tau, \ell$ : Time constant and leak

Key Insight:

Only learn cell-type-level parameters, not individual synapses
Connectome provides the specific wiring pattern
Biological constraint: neurons of the same type have similar properties

Optimization Strategy

Multi-Objective Loss Function:

\mathcal{L}_{\text{total}} = \mathcal{L}_{\text{consistency}} + \mathcal{L}_{\text{stability}} + \mathcal{L}_{\text{speed}} + \mathcal{L}_{\text{entropy}} + \mathcal{L}_{\text{reg}}

Where:

Linear Consistency Loss: Activity represents head direction in a linear code
Stability Loss: Bump should persist in absence of input
Minimum Speed Loss: Network should update smoothly with angular velocity input
Entropy Loss: Encourage distributed representations
L1/L2 Regularization: Prevent overfitting, encourage sparse solutions

No Neural Data Required:

Loss based on theoretical properties of head direction system
Functional requirements derived from behavioral observations
Self-supervised learning from connectome structure

Results

Functional Emergence:

Model spontaneously forms a stable activity "bump" that tracks head direction
Bump moves smoothly in response to angular velocity inputs
Reproduces key features of biological head direction cells

Parameter Insights:

Learned coupling matrix $Z^{AB}$ reveals functional motifs
Specific cell types show predicted excitatory/inhibitory interactions
Matches known biology (e.g., ring neuron inhibition patterns)

Generalizability:

Same approach applicable to other circuits
Demonstrates connectome + minimal assumptions → function

Significance

This work shows that:

Connectomes dramatically reduce parameter space in neural network models
Functional constraints (not neural recordings) can be sufficient for optimization
Cell-type-level parameterization is a powerful middle ground between fully individual and fully shared parameters

3. Borst 2024 - Differential Temporal Filtering in Optic Lobe

Journal: bioRxiv (2024)
Authors: Alexander Borst

Model Approach

Connectome Integration:

5 adjacent optic columns (retinotopic organization)
65 cell types per column
Intra-columnar connectivity: Within-column synapses
Inter-columnar connectivity: Lateral connections between columns

Neuron Model:

Electrically compact single compartment
Conductance-based: Hodgkin-Huxley style
Accounts for:
- Leak conductance
- Excitatory synaptic conductances (cholinergic, glutamatergic)
- Inhibitory conductances (GABAergic)
- Voltage-dependent conductances (for spiking neurons)

Temporal Filtering:

Each cell type has unique synaptic time constants
Creates temporal filtering cascade across visual processing layers
Critical for motion detection (delay lines)

Key Findings

Temporal diversity is essential: Different cell types filter visual input at different timescales
Spatial integration: Lateral connections shape receptive field properties
Emergent motion sensitivity: Connectome + temporal parameters → direction selectivity

4. Full Brain LIF Model (Nature 2024)

Journal: Nature (2024)
Title: A Drosophila computational brain model reveals sensorimotor processing

Scale & Ambition

Whole-Brain Model:

~140,000 neurons (entire adult fly brain)
~50 million synapses
All major brain regions: optic lobes, central brain, motor centers

Model Type: Leaky Integrate-and-Fire (LIF)

\tau_m \frac{dV_i}{dt} = -(V_i - V_{\text{rest}}) + R_m \sum_j g_{ij}(V_j - V_{\text{syn}})

Where:

$g_{ij}$ : Synaptic conductance from $j$ to $i$ (scaled by connectome count)
$V_{\text{syn}}$ : Reversal potential (depends on neurotransmitter: excitatory or inhibitory)

Connectome Constraints

From FlyWire:

Connectivity matrix $C_{ij}$
Neurotransmitter predictions → Excitatory/Inhibitory assignment
Cell type labels

Assumptions & Limitations (acknowledged by authors):

Each neuron is exclusively excitatory or inhibitory (no co-transmission)
Neural morphology ignored (point neurons)
Receptor dynamics simplified (no NMDA, no metabotropic receptors)
Gap junctions ignored (not visible in EM)
Synaptic weights uniform within cell type

Parameter Optimization

Minimal Free Parameters:

Per-cell-type conductance scaling factors (~1000 cell types → ~1000 parameters)
Time constants $\tau_m$ per cell type
Threshold and reset potentials

Optimization Method:

Fit to behavioral data (not single-neuron recordings)
Reproduce sensorimotor transformations (e.g., optomotor response, phototaxis)
Trial-and-error + some automated search

Results & Insights

Functional Predictions:

Predicts activity flow from sensory input to motor output
Identifies key sensorimotor pathways
Reveals bottleneck regions in information flow

Network Analysis:

Community detection reveals functional modules
Compares structural vs. functional connectivity
Identifies hub neurons critical for integration

Limitations:

Lower accuracy than Turaga's model (due to simpler neuron model)
Requires behavioral validation (not single-neuron predictions)
Many biological details omitted

Value:

Provides whole-brain context for understanding any neural circuit
Enables perturbation experiments in silico (lesion studies, drug effects)
Foundation for future whole-brain simulations

🪱 C. elegans Connectome-Based Models

The C. elegans nervous system (~302 neurons, ~7000 synapses) was the first complete connectome (1986), making it a prime target for whole-organism neural modeling.

1. Zhao et al., 2024 - Integrative Brain-Body-Environment Model ⭐️ Most Comprehensive

Journal: Nature Computational Science (2024)
Title: An integrative data-driven model simulating C. elegans brain, body and environment interactions

This is the most biophysically detailed whole-organism model to date, integrating:

Full nervous system (302 neurons)
Muscular system (95 body wall muscle cells)
Biomechanical body model
Environmental interaction (fluid dynamics)

Connectome Data Integration

Structural Connectivity:

Chemical synapses: 5,000+ from White et al. (1986) connectome + updates
Gap junctions: ~900 electrical synapses
Neuromuscular junctions: Neurons → muscle connections

Cell Type Information:

All 302 neurons with anatomical classifications
Neurotransmitter types: ACh, GABA, glutamate, dopamine, serotonin, etc.
Receptor distributions (from gene expression data)

Multi-Scale Modeling Framework

1. Neuron Models (Biophysically Detailed):

Morphologically-derived multi-compartmental models:

Neurons reconstructed from EM (dendrites, soma, axon)
10-50 compartments per neuron depending on complexity

Compartment dynamics (Hodgkin-Huxley style):

C_m \frac{dV}{dt} = -I_{\text{leak}} - I_{\text{channels}} - I_{\text{syn}} + I_{\text{axial}}

Where:

Somatic HH dynamics: Na$^+ $, K$ ^+ $, Ca$ ^{2+}$, leak channels
Passive neurites: Dendrites and axon have only leak currents
Rationale: Most C. elegans neurons are "graded" (non-spiking), active conductances concentrated in soma

2. Synapse Models:

Chemical Synapses (Graded Transmission):

Most synapses are graded (not spike-triggered)
Neurotransmitter release proportional to presynaptic voltage:

I_{\text{syn}} = g_{\text{syn}} \cdot m_{\infty}(V_{\text{pre}}) \cdot (V_{\text{post}} - E_{\text{syn}})

Where $m_{\infty}(V_{\text{pre}})$ is a sigmoid function of presynaptic voltage

Gap Junctions (Electrical Coupling):

I_{\text{gap}} = g_{\text{gap}} \cdot (V_{\text{neighbor}} - V_{\text{self}})

3. Muscle Models:

95 body wall muscle cells (4 quadrants: dorsal/ventral, left/right)
Calcium dynamics + contraction: $F_{\text{muscle}} = f([Ca^{2+}]_i)$
Receives input from motor neurons (excitatory: cholinergic; inhibitory: GABAergic)

4. Biomechanical Body Model:

Worm body as elastic rod with curvature constraints
Muscles generate bending moments
Fluid-structure interaction (worm swims/crawls in simulated environment)

5. Environment:

2D or 3D space
Chemotaxis gradients
Mechanosensory stimuli

Parameter Optimization Strategy

Challenge: Tens of thousands of parameters across neurons, synapses, muscles

Multi-Stage Hierarchical Optimization:

Stage 1: Single Neuron Parameters

Fit individual neuron models to electrophysiology data (where available)
Parameters: Channel densities ( $\bar{g}_{\text{Na}}$ , $\bar{g}_{\text{K}}$ , etc.), leak, capacitance
Method: Evolutionary algorithms (similar to BluePyOpt approach)
Constraint: Very few C. elegans neurons have been recorded, so many neurons use cell-class defaults

Stage 2: Synaptic Parameters

Conductance scaling for each synapse type
Parameters: $g_{\text{syn}}$ for different neurotransmitter types
Method: Optimize to match known circuit behaviors (e.g., tap withdrawal circuit dynamics)

Stage 3: Neuromuscular Parameters

Motor neuron → muscle synaptic weights
Muscle contraction dynamics parameters
Method: Fit to locomotion data (crawling/swimming kinematics)

Stage 4: Whole-System Integration

Fine-tune inter-system parameters
Optimize for behavioral outcomes:
- Forward/backward locomotion
- Turning behavior
- Chemotaxis performance
Method: Gradient-free optimization (genetic algorithms, CMA-ES)
- Reason: System is non-differentiable (biomechanics, environment)

Total Parameters:

~10,000-100,000 parameters optimized
Connectome structure reduces from billions (if unconstrained) to this tractable number

Validation & Results

Neural Dynamics:

Reproduces known neural activity patterns (e.g., AVA/AVB forward/reverse command interneurons)
Predicts activity of neurons not yet recorded

Behavior:

Locomotion: Realistic crawling and swimming gaits
Chemotaxis: Navigates chemical gradients with biologically realistic strategies
Sensorimotor Reflexes: Responds to touch, nose touch, etc.

Emergent Properties:

Central Pattern Generators (CPGs): Rhythmic locomotion emerges from circuit structure + dynamics
Sensory Integration: Multiple sensory modalities integrated for decision-making
Adaptation: Shows habituation to repeated stimuli

Key Insights

Gap junctions are critical: Removing electrical synapses degrades many behaviors
Graded transmission dominates: Most information transfer is analog, not digital (spikes)
Embodiment matters: Body mechanics and environment shape neural activity patterns
Multi-scale coupling: Cannot understand neurons without muscles/body, or vice versa

Significance

Scientific:

First whole-organism simulation with this level of biophysical detail
Demonstrates feasibility of digital organisms
Platform for hypothesis testing (in silico genetics, drug effects)

Technical:

Shows how to integrate disparate data types (connectome, gene expression, biomechanics)
Benchmark for whole-organism modeling

Limitations:

Still many unknown parameters (borrowed from other organisms or estimated)
Limited to simple behaviors (no learning/memory in this model)
Computationally expensive (hours to simulate seconds of behavior)

2. Morrison & Young, 2025 - Data-Driven Premotor Network Model

Journal: arXiv (2025)
Authors: Megan Morrison, Lai-Sang Young
Title: A data-driven biophysical network model reproduces C. elegans premotor neural dynamics

Focus: Forward/Backward Locomotion Circuit

Subset of Connectome:

~20-30 key neurons in premotor circuit:
- Command interneurons: AVA (reverse), AVB/PVC (forward)
- Motor neurons: VA, VB, DA, DB classes
- Sensory neurons providing input

Why This Circuit:

Well-characterized functionally (lots of calcium imaging data)
Critical for basic locomotion
Manageable size for detailed parameter optimization

Model Details

Neuron Model:

Single-compartment conductance-based (simpler than Zhao et al.)
Graded synapses (same rationale: non-spiking neurons)

Data-Driven Approach:

Constraint: Extensive calcium imaging dataset from Leifer lab and others
Optimization: Fit model to reproduce time-series of neural activity during behavior

Parameter Optimization:

Gradient descent possible (differentiable neuron models)
Loss function: MSE between model and experimental calcium traces
Regularization: Stay close to biologically plausible parameter ranges

Results

Reproduces Key Features:

AVA/AVB mutual inhibition dynamics
Motor neuron sequential activation during locomotion
Transition dynamics between forward and reverse

Predictions:

Identifies synapses most critical for state transitions
Predicts effects of ablating specific neurons (testable experimentally)

Advantages:

Tightly constrained by abundant functional data
High confidence in parameters for this specific circuit

Limitations:

Doesn't include body/environment (open-loop simulation)
Limited to premotor circuit, not whole brain

3. Creamer, Leifer & Pillow, 2024 - Bridging Connectome and Whole-Brain Activity

Journal: bioRxiv (2024)
Authors: Matthew S. Creamer, Andrew M. Leifer, Jonathan W. Pillow

Key Question:

Can we predict whole-brain neural dynamics from connectome alone?

Approach

Linear Dynamical System:

\mathbf{x}(t+1) = \mathbf{W} \mathbf{x}(t) + \mathbf{u}(t) + \boldsymbol{\epsilon}(t)

Where:

$\mathbf{x}(t)$ : Neural activity vector (302 neurons)
$\mathbf{W}$ : Connectivity matrix (initialized from connectome)
$\mathbf{u}(t)$ : External input
$\boldsymbol{\epsilon}(t)$ : Noise

Connectome Initialization:

$W_{ij} \propto C_{ij}$ (synaptic count from connectome)
Sign from neurotransmitter prediction

Optimization

Data: Whole-brain calcium imaging (Leifer lab)

Simultaneous recording of all 302 neurons
Multiple behavioral states

Method:

Fit $\mathbf{W}$ to maximize likelihood of observed activity sequences
Compare connectome-initialized vs. random initialization

Key Findings

Connectome provides strong prior:
- Connectome-initialized models converge faster and to better solutions
- But still need functional data to refine weights
Connectome alone is insufficient:
- Pure connectome (without weight optimization) predicts only ~30-40% of variance
- Need ~2-3× weight rescaling per synapse type on average
Functional motifs differ from structural:
- Some weak structural connections are functionally strong (amplified by dynamics)
- Some strong structural connections are functionally weak (depressed)

Interpretation:

Connectome is a scaffol, not the full story
Synaptic weights vary significantly across connections of the same type
Need both structure AND physiology for accurate predictions

🐭 Mouse Visual Cortex Connectome-Based Models

The mouse visual cortex presents unique challenges:

Incomplete connectome (only ~1 mm³ reconstructed)
~100,000 neurons in reconstructed volume
Dense local connectivity + long-range projections
Functional data from large-scale calcium imaging and electrophysiology

1. MICrONS Consortium, 2025 - Functional Connectomics ⭐️ Game-Changing Dataset

Journal: Nature (2025)
Links:

MICrONS Dataset Overview

Unprecedented Scale:

EM reconstruction: 1.3 mm³ of mouse visual cortex (V1, LM, AL)
~100,000 neurons reconstructed
~500 million synapses mapped
Functional imaging: Two-photon calcium imaging from ~75,000 neurons (subset of EM volume)
Co-registration: Same neurons in EM and functional imaging

This is the first mammalian dataset with both structure and function at scale.

Connectome Data Structure

Connectivity Matrix:

$C_{ij}$ : Number of synapses from neuron $j$ to $i$
Spatial information: Synapse locations on dendrites
Excitatory (spiny) vs. Inhibitory (smooth) classification
Layer information (L2/3, L4, L5, L6)

Functional Data:

Responses to natural scenes, gratings, movies
Spontaneous activity
Tuning properties: orientation, direction, spatial frequency, etc.

Key Modeling Findings

1. Structural-Functional Connectivity Relationship:

Question: Does structural connectivity predict functional connectivity?

Approach:

Structural: $C_{ij}$ (synapse count)
Functional: Correlation of neural activity $\rho_{ij} = \text{corr}(x_i(t), x_j(t))$

Results:

Weak but significant correlation: $r \approx 0.3-0.4$ between structure and function
Anatomy is not destiny: Functional connections can be strong without direct structural connections (via polysynaptic paths)
Shared input dominates: Many functional correlations arise from common input, not direct connections

2. General Wiring Rule:

Discovery: Connectivity follows predictable rules based on:

Distance: Exponential decay $P(\text{connection}) \propto e^{-d/\lambda}$
Functional similarity: Neurons with similar tuning (e.g., same orientation preference) connect more
Cell type: Specific excitatory-inhibitory motifs

Model:

P(C_{ij} > 0 | \text{features}) = \sigma(\beta_0 + \beta_1 d_{ij} + \beta_2 \Delta\theta_{ij} + \beta_3 \mathbb{I}_{\text{type}})

Where:

$d_{ij}$ : Somatic distance
$\Delta\theta_{ij}$ : Difference in orientation preference
$\mathbb{I}_{\text{type}}$ : Cell type indicators

Implications:

Can generate synthetic connectomes for unmapped regions
Suggests developmental wiring rules (activity-dependent plasticity)

3. Predictive Models of Neural Responses:

Approach: Use connectome to constrain neural network model (similar to fly work)

Model Architecture:

Visual Input → Linear-Nonlinear encoding → Recurrent Network (connectome-constrained) → Predicted Activity

Connectome Integration:

Recurrent connections $W_{ij} \propto C_{ij}$
Learn scaling factors for different connection types

Results:

Improves predictions: Connectome-constrained models outperform purely data-driven RNNs
Still gap: Only explains ~50-60% of neural variance (vs. ~70-90% in fly)
Reasons for gap:
- Incomplete connectome (long-range connections missing)
- More complex dendritic computations in mammals
- Neuromodulation not accounted for

2. Tolias et al., 2025 - Foundation Model of Neural Activity

Journal: Nature (2025)
Title: Foundation model of neural activity predicts response to new stimulus types

Beyond Connectome: Data-Driven Foundation Model

Approach:

Train large neural network on massive functional dataset
Don't explicitly use connectome (yet), but learn functional connectivity implicitly
Test generalization to new stimuli and tasks

Model: Transformer-based architecture

Input: Neural activity from subset of neurons
Output: Predicted activity of all neurons
Trained on diverse stimuli (natural images, movies, gratings, etc.)

Scale:

Trained on ~75,000 neurons (MICrONS dataset)
Billions of parameters in foundation model

Results

Generalization:

Predicts responses to novel stimulus types not in training (e.g., trained on static images, predicts movies)
Captures behavioral state modulation (running vs. stationary)

Comparison to Connectome Models:

Pure data-driven model (this work): High accuracy but less interpretable
Pure connectome model: Lower accuracy but mechanistically interpretable
Future: Hybrid models combining both approaches

3. Rajan et al., 2020 - Data-Constrained RNNs (CURBD)

Journal: bioRxiv (2020)
Authors: Kanaka Rajan et al.
Title: Inferring brain-wide interactions using data-constrained recurrent neural network models

Approach: Reverse-Engineering Brain-Wide Dynamics

Scale: Whole-brain calcium imaging across multiple regions (not single-neuron resolution)

Model: Recurrent Neural Network (RNN)

\mathbf{x}(t+1) = f(\mathbf{W} \mathbf{x}(t) + \mathbf{W}_{\text{in}} \mathbf{u}(t))

CURBD Method (Connectivity Uncovered via Recurrent-Bayesian Dynamics):

Fit RNN to multi-region activity data
Decompose total activity into source currents from each region
Infer effective connectivity between regions

Connectome Relevance

Not directly using synaptic connectome, but:

Inferred connectivity compared to known anatomical projections
Validates that strong anatomical pathways correspond to strong functional interactions
Identifies unexpected functional pathways not obvious from anatomy

Key Insight:

Functional connectivity $\neq$ Structural connectivity
Dynamics amplify/suppress anatomical connections

4. Blue Brain Project - Neocortical Microcircuit Reconstruction ⭐️ Mammalian Landmark

Journal: Cell (2015)
Authors: Henry Markram et al.
Title: Reconstruction and Simulation of Neocortical Microcircuitry
Link: https://www.cell.com/cell/fulltext/S0092-8674(15)01191-5

This is the first data-driven digital reconstruction of mammalian cortical tissue at cellular resolution, representing a paradigm shift in how we model complex brain circuits.

Background & Vision

The Blue Brain Project (started 2005, EPFL):

Goal: Reverse-engineer the mammalian brain through detailed simulation
Philosophy: Integrate all available experimental data into a unified computational model
Target: Rat somatosensory cortex (barrel cortex) as a starting point

Why This Matters:

Mammalian cortex is orders of magnitude more complex than invertebrate brains
No complete connectome available (EM reconstruction not feasible for mm³ of tissue)
Must infer connectivity from statistical rules + sparse experimental data

Scale & Scope

Reconstructed Volume:

~0.3 mm³ of rat somatosensory cortex (juvenile P14)
31,000 neurons (all layers: L1-L6)
37 million synapses
55 morphological cell types (m-types)
207 morpho-electrical types (me-types) when including electrical properties

This is not a connectome-based model in the traditional sense, but rather a statistically reconstructed model.

The Challenge: No Complete Connectome

Unlike flies or worms, we cannot trace every synapse in mammalian cortex. Instead:

Data-Driven Statistical Reconstruction:

Neuron Positions:
- Sample from experimentally measured cell density distributions
- Layer-specific densities (e.g., L5 has fewer but larger neurons)
- Spatial clustering based on minicolumn structure
Morphologies:
- Library of ~1,000 3D-reconstructed neurons (from experiments)
- Each neuron type assigned a morphology from this library
- Morphologies include full dendritic and axonal arborizations
Connectivity Rules (This is the key innovation):

Touch Detection Algorithm:

For each pair of neurons $(i,j)$ :

Overlap axon of neuron $i$ with dendrites of neuron $j$
If axon and dendrite are close (< 2 μm), potential synapse
Connection probability depends on:
- Cell types (m-type → m-type connectivity matrix from experiments)
- Distance between somata
- Overlap volume of axonal and dendritic arbors

P(\text{synapse}_{ij}) = f(\text{type}_i, \text{type}_j, d_{ij}, V_{\text{overlap}})

Bouton Density (synapses per connection):

Measured from paired recordings and anatomy
Cell-type specific (e.g., L5 pyramidal → L5 pyramidal: 3-5 synapses/connection)

Result:

Generates a predicted connectome consistent with all experimental constraints
Not the exact biological connectome, but statistically equivalent

Neuron Models: Multi-Compartmental Hodgkin-Huxley

For Each of 31,000 Neurons:

Morphology:

Full 3D reconstruction with 100-1,000+ compartments
Dendrites, soma, axon initial segment

Electrical Dynamics (Hodgkin-Huxley):

C_m \frac{dV}{dt} = -\sum_{\text{channels}} I_{\text{channel}} - I_{\text{syn}} + I_{\text{axial}} + I_{\text{ext}}

Ion Channels (13 types):

Na$^+$: NaTs, NaTg, Nap (various kinetics)
K$^+$: Kv1, Kv2, Kv3, Kv7, SK, BK
Ca$^{2+}$: CaHVA, CaLVA, Ih
Leak

Channel Distributions:

Soma: High Na$^+ $and K$ ^+$ density
Dendrites: Ih channels (increase with distance from soma), Ca$^{2+}$ channels
Axon initial segment: Highest Na$^+$ density (spike initiation zone)

Parameter Optimization:

207 me-types, each with unique channel density combinations
Optimized to match experimental electrophysiology from patch-clamp recordings
Uses evolutionary algorithms (precursor to BluePyOpt)

Constraints:

Spike shape, firing frequency, adaptation, voltage sag, rebound spikes
~10-20 features per neuron type

Synapse Models

Detailed Synaptic Dynamics:

AMPA, NMDA, GABA_A, GABA_B receptors:

For AMPA (example):

I_{\text{AMPA}} = g_{\text{AMPA}} \cdot (V - E_{\text{exc}}) \cdot \sum_{\text{spikes}} \alpha(t - t_{\text{spike}})

Where $\alpha(t)$ is a double-exponential function (rise + decay)

Synaptic Plasticity:

Short-term dynamics: Depression and facilitation
- Use $U$ (utilization parameter) and $\tau_{\text{rec}}$ (recovery time)
- Measured from paired-pulse experiments for each connection type
No long-term plasticity in this model (static weights)

Connectome-Like Detail:

Every synapse has spatial location on dendrite
Synaptic weights calibrated from experiments (miniEPSC amplitudes)

Simulation & Validation

Computational Challenge:

31,000 multi-compartmental neurons
Each neuron: 100-1000 compartments
Total: ~10 million compartments
Requires supercomputer (IBM Blue Gene)

In Vivo-Like Simulation:

Spontaneous Activity:

Inject Poisson-distributed background input (mimicking thalamic input + recurrent activity)
Model generates asynchronous irregular activity similar to awake cortex
Firing rates: 0.1-10 Hz (biologically realistic)

Emergent Properties:

Layer-specific activity patterns:
- L5 neurons more active than L2/3
- Matches experimental observations
Cell-type specific recruitment:
- Inhibitory interneurons (fast-spiking) respond rapidly to excitation
- Pyramidal cells show diverse firing patterns
Network oscillations:
- Spontaneous gamma oscillations (30-80 Hz) emerge
- No explicit oscillatory mechanisms, purely from network structure + dynamics
Propagation of activity:
- Sensory input in L4 → spreads to L2/3 and L5
- Realistic timing and amplitudes

Validation Against Experiments

Predictions Tested:

Connection probabilities:
- Model predictions vs. paired recording data
- Agreement within experimental variability for most cell-type pairs
Synaptic physiology:
- PSP amplitudes, kinetics, short-term dynamics
- High concordance with experiments
Network responses to stimulation:
- Optogenetic stimulation patterns
- Model reproduces experimental post-stimulus activity

Discrepancies:

Some rare connection types under-sampled in experiments
Long-range connections (beyond 0.3 mm³) missing

Key Innovations & Contributions

Methodological:

Statistical connectome generation: When you don't have EM, use touch-detection
Integration framework: Combines morphology, electrophysiology, connectivity, synapse physiology
Scalability: Workflow can be applied to other brain regions

Scientific:

Emergent properties: Shows many cortical features arise from structure + local dynamics
Testable predictions: Generates hypotheses about unmeasured connections and dynamics
In silico experiments: Enables perturbations impossible in vivo (lesion specific cell types, etc.)

Open Science:

Model and tools released publicly
Enabled community to build upon this foundation

Subsequent Developments (2015-2024)

Expansion to Other Regions:

Mouse Whole Neocortex Model (2024):
- Expanded from 0.3 mm³ to entire mouse neocortex
- Integrates Allen Mouse Brain Connectivity Atlas
- Models long-range projections between areas
- ~75 million neurons predicted
Hippocampus CA1 (2024) (Romani et al., PLoS Biology):
- Community-based reconstruction
- Full-scale model of rat hippocampus CA1
- Similar statistical reconstruction approach

Refinement of Methods:

Part I: Anatomy (2024) (Reimann et al., eLife):
- Updated morphology library
- Improved connectivity rules (data-driven machine learning)
- Multi-scale from micro- to mesocircuits
Part II: Physiology (2024) (Isbister et al., eLife):
- Refined synaptic parameters from new experiments
- Validation against optogenetics data
- Neuromodulation effects (ACh, dopamine, etc.)

New Tools:

Connectome-Manipulator:
- Software to interactively explore and modify connectomes
- Test structure-function relationships
- Counterfactual circuit analysis

Comparison: Blue Brain vs. MICrONS vs. Fly Connectome Models

Aspect	Blue Brain (Rat)	MICrONS (Mouse)	Turaga (Fly)
Connectome Type	Statistical (predicted)	Partial EM (real)	Full EM (real)
Scale	31K neurons, 37M synapses	100K neurons, 500M synapses	60K neurons
Neuron Model	Multi-compartmental HH	Point (in most models)	Mechanistic point
Validation Data	Electrophysiology	Calcium imaging	Calcium imaging
Prediction Accuracy	Qualitative agreement	Moderate (50-60%)	High (70-90%)
Computational Cost	Extreme (supercomputer)	Moderate	Moderate (GPU)
Strength	Biophysical detail	Structure-function link	Single-neuron predictions
Limitation	Connectome is inferred	Incomplete connectome	Simplified neuron model

Significance & Legacy

Scientific Impact:

Demonstrated feasibility of detailed mammalian cortex simulation
Revealed that much cortical complexity can emerge from known components
Created a reference model for testing hypotheses

Technological Impact:

Drove development of simulation software (NEURON at scale, CoreNEURON)
BluePyOpt parameter optimization framework (as discussed earlier)
Inspired similar projects (Human Brain Project, etc.)

Philosophical Impact:

Shifted paradigm from reductionist experiments to integrative modeling
Highlighted importance of data standards and reproducibility
Demonstrated value of open models for community

Critiques & Ongoing Debates:

Is statistical reconstruction sufficient? Or do we need every real synapse?
Complexity vs. interpretability: Model has millions of parameters, hard to understand
Validation challenge: Hard to conclusively validate such complex models
Missing mechanisms: Plasticity, neuromodulation added later

Current Status:

Blue Brain continues to expand and refine models
Methods adopted by many groups worldwide
Convergence with connectomics (EM-based) approaches

5. Billeh et al., 2020 - Allen Institute V1 Biophysical Network Model

Journal: bioRxiv → Cell Reports (2020)
Authors: Yazan N. Billeh et al., Allen Institute
Title: Systematic Integration of Structural and Functional Data into Multi-scale Models of Mouse Primary Visual Cortex

This work bridges Blue Brain's statistical reconstruction approach with Allen's rich experimental datasets, creating a data-constrained V1 model with real anatomical connectivity.

Motivation & Approach

Combining Best of Both Worlds:

Blue Brain approach: Detailed biophysics, statistical connectivity
Allen resources: Cell type atlas, functional data, connectivity measurements
This work: Integrate Allen's real data into a large-scale biophysical model

Scale:

~230,000 neurons (larger than Blue Brain's initial model)
~280 million synapses
All layers of V1 + some LGN (thalamus)
17 excitatory types + multiple inhibitory types

Connectome Data Integration

Unlike Blue Brain's pure statistical approach, this model uses:

Cell Type Atlas (Allen Cell Types Database):
- Transcriptomic cell types from single-cell RNA-seq
- Morphological reconstructions
- Electrophysiological properties from patch-clamp
Connectivity Measurements:
- Paired recordings: Connection probabilities for many cell-type pairs
- MouseLight project: Long-range axonal projections
- Electron microscopy: Synaptic ultrastructure (limited volume)
Functional Data:
- Responses to visual stimuli (gratings, natural movies)
- Two-photon calcium imaging across layers
- Neuropixels recordings

Model Architecture

Neuron Models (Two Levels):

1. Biophysically Detailed (GLIF5 + detailed models):

Subset of neurons: Multi-compartmental Hodgkin-Huxley
Uses Allen's optimized parameters (from earlier work)
~10,000 detailed neurons strategically placed

2. Point Neurons (LIF and GLIF):

Majority: Generalized Leaky Integrate-and-Fire (GLIF)
Cell-type specific parameters
Computationally efficient for large-scale simulation

Hybrid Strategy Rationale:

Balance between biological detail and computational feasibility
Can simulate seconds of activity in reasonable time
Enables large-scale perturbation experiments

Connectivity Construction

Layer-by-Layer Connection Rules:

For each pre-synaptic neuron type → post-synaptic neuron type:

P(\text{connection}) = f(\text{distance}, \text{layer}, \text{type}_{\text{pre}}, \text{type}_{\text{post}})

Data-Driven Parameters:

Connection probabilities: From paired recordings where available
Otherwise: Extrapolated from similar cell types + morphology overlap
Synaptic weights: Calibrated to PSP amplitudes from experiments

Long-Range Connections:

V1 ↔ Higher visual areas (LM, AL, PM, etc.)
Thalamus (LGN) → V1
Based on Allen Mouse Brain Connectivity Atlas (anterograde/retrograde tracing)

Parameter Optimization

Challenge: 100+ free parameters even with cell-type-level constraints

Multi-Stage Optimization:

Stage 1: Single-Cell Parameters

Already done (Allen Cell Types Database)
Each GLIF/detailed model optimized to match its cell type's responses

Stage 2: Synaptic Weights

Optimize to match:
- Spontaneous activity levels (firing rates per layer/type)
- Evoked activity patterns (visual responses)
- Network stability (avoid runaway excitation)

Optimization Method:

Genetic algorithm for global parameters
Manual tuning for fine details (biologically guided)
Constraint: Stay within experimentally measured ranges

Validation: Comparison to In Vivo Data

Spontaneous Activity:

✅ Firing rates per layer: L2/3 < L4 < L5/6 (matches experiments)
✅ Asynchronous irregular activity
✅ Interneuron vs pyramidal cell rates

Evoked Responses (Visual Stimuli):

Gratings: Orientation tuning curves
- ✅ Model neurons show similar tuning width as real neurons
- ⚠️ Some cell types over-/under-responsive
Natural movies:
- ✅ Temporal dynamics roughly match
- ⚠️ Absolute response magnitudes differ

Network Dynamics:

✅ Oscillations in gamma band (30-80 Hz) emerge
✅ State-dependent activity (running vs. stationary)

Key Findings

1. Inhibition is Critical:

Multiple inhibitory cell types (PV, SST, VIP) each play distinct roles
Removing any one type drastically changes network dynamics
PV cells control gain, SST cells provide divisive normalization

2. Recurrent Amplification:

Weak LGN input is amplified by recurrent V1 connections
L4 → L2/3 feedforward pathway is key
Matches experimental observations

3. Predictions Tested:

Model predicted effects of optogenetic manipulation
Some predictions confirmed experimentally post-hoc

4. Layer-Specific Computations:

L4: Faithful relay of thalamic input
L2/3: Integration and decorrelation
L5: Motor-related modulation
Emergent from connectivity patterns

Comparison to Other Approaches

Feature	Billeh 2020 (Allen)	Blue Brain 2015	Turaga 2024 (Fly)
Connectome Type	Mixed (real + inferred)	Statistical	Full EM
Scale	230K neurons	31K neurons	60K neurons
Neuron Model	Hybrid (GLIF + detailed)	Multi-compartmental HH	Mechanistic point
Validation	Functional data (imaging)	Electrophysiology	Single-neuron calcium imaging
Strength	Large scale + real connectivity	Biophysical detail	Predictive accuracy
Main Use	Circuit perturbations	Emergent properties	Stimulus-response mapping

Significance

Methodological:

Shows hybrid models (mix of detailed & simplified neurons) can work
Demonstrates value of integrating multiple data streams
Provides workflow for other brain regions

Scientific:

First V1 model that captures layer-specific cell type diversity
Reveals role of specific interneuron types
Generates testable predictions

Open Science:

Model publicly available (BMTK/SONATA format)
Enables community to run in silico experiments
Used by many labs for hypothesis testing

6. Potjans & Diesmann, 2014 - Canonical Cortical Microcircuit Model

Journal: Cerebral Cortex (2014)
Authors: Tobias C. Potjans, Markus Diesmann
Title: The Cell-Type Specific Cortical Microcircuit: Relating Structure and Activity in a Full-Scale Spiking Network Model

Although based on statistical connectivity (not EM), this model is foundational and widely used. It deserves mention because it's been the standard reference for cortical modeling.

The "Canonical" Cortical Circuit

Motivation:

Is there a generic circuit template that repeats across cortex?
Can we build a minimal model that captures essential features?

Based On:

Douglas & Martin's "canonical microcircuit" hypothesis
Data from cat/monkey V1, rat S1 (combined)
Connection probabilities from paired recordings

Model Structure

Scale:

1 mm² cortical column
~80,000 neurons
4 layers (L2/3, L4, L5, L6) × 2 populations (Exc, Inh)
= 8 populations total

Neuron Model:

Leaky Integrate-and-Fire (LIF)
Current-based synapses
Simple, computationally efficient

Connectivity:

Connection probability matrix $P_{ij}$ (from population $j$ to population $i$ ):

\begin{bmatrix} & L2/3_E & L2/3_I & L4_E & L4_I & L5_E & L5_I & L6_E & L6_I \\ L2/3_E & 0.10 & 0.17 & 0.03 & 0.05 & 0.02 & ... \\ L2/3_I & 0.14 & 0.24 & ... \\ ... & ... & ... & ... \\ \end{bmatrix}

Key Features:

Strong L4 → L2/3 feedforward
Recurrent connections within layers
L5/6 → L2/3 feedback
External thalamic input mainly to L4

Why This Model is Important

1. Simplicity Meets Biology:

Only 8 populations, but captures essential cortical features
Widely used as "minimal cortical model"
Easy to modify and extend

2. Spontaneous Activity:

Generates asynchronous irregular activity
Firing rates: ~1-10 Hz (realistic)
No need for fine-tuning (robust)

3. Testable Predictions:

Response to layer-specific stimulation
Effects of inhibition blockade
Many predictions later confirmed experimentally

4. Benchmark Model:

Used to test new simulation methods
Standard for comparing to more complex models

Limitations (Acknowledged):

Too coarse: Only 2 cell types (E, I) per layer
- Real cortex has >10 types
Statistical connectivity: Not based on real wiring diagram
Simple neuron model: No dendrites, single time constant
No long-range connections: Only local column

But → It's a starting point, not the final word

🧬 Theory & Principles: What Have We Learned?

This section synthesizes theoretical insights from connectome-based modeling across all organisms.

1. Beiran & Litwin-Kumar, 2024 - Theoretical Limits of Connectome-Constrained Prediction

Journal: bioRxiv (2024)
Authors: Manuel Beiran, Ashok Litwin-Kumar (Columbia University)
Title: Prediction of neural activity in connectome-constrained recurrent networks

The Central Question

Is the connectome sufficient to predict neural dynamics?

Even with perfect knowledge of:

Every synapse ( $C_{ij}$ )
Neurotransmitter types (E/I)
Cell types

Can we predict neural activity? Or is there irreducible uncertainty?

Theoretical Framework

Connectome-Constrained RNN:

\tau \frac{dx_i}{dt} = -x_i + \sum_j w_{ij} \phi(x_j) + I_i^{\text{ext}}

Where:

$w_{ij} = g \cdot C_{ij} \cdot s_j$ $w_{ij} = g \cdot C_{ij} \cdot s_{j}$
- $C_{ij}$ : Binary connectivity (from connectome)
- $s_j$ : Sign (±1, from neurotransmitter)
- $g$ : Unknown synaptic strength

Key Unknown: $g$ (varies across synapses even of same type)

Main Results

1. Degeneracy Problem:

Many different weight configurations ( $g$ values) produce similar dynamics
Connectome + cell types + signs → Still infinite family of solutions

2. Lower Bound on Uncertainty:

For a network with $N$ neurons and $S$ synapses:

\sigma_{\text{prediction}}^2 \geq f(N, S, \sigma_g^2)

Where $\sigma_g^2$ is variance in synaptic weights

Implication: Even with connectome, prediction error has a floor

3. What Helps Reduce Uncertainty:

✅ Functional data (activity recordings)
✅ Synaptic weight measurements (physiology)
✅ Strong connectivity structure (hub neurons reduce uncertainty)
❌ Just adding more connectivity info (if weights unknown) has diminishing returns

Insights for Connectome Projects

Connectome is Necessary but Not Sufficient:

Provides the scaffold (who connects to whom)
But dynamics depend on quantitative weights and time constants
Need to combine:
- Structure (connectome)
- Physiology (weights, kinetics)
- Function (activity recordings)

Practical Recommendations:

Prioritize sparse synaptic weight measurements over complete connectivity
Measure temporal parameters (time constants, delays)
Use functional data to constrain the unknown parameters
Focus on hub neurons and recurrent motifs (highest impact on dynamics)

2. General Principles from Cross-Species Comparisons

What Works Across All Organisms?

Principle 1: Connectome Constrains Dynamics (Partially)

Quantified:

Fly (Turaga): Connectome explains ~60-70% of variance → Add biophysics → 70-90%
C. elegans (Creamer): Connectome alone ~30-40% → Add physiology → ~60%
Mouse (MICrONS): Structure-function correlation r ≈ 0.3-0.4

Implication:

Connectome is highly informative but not fully deterministic
Need 2-3× weight rescaling on average

Principle 2: Cell-Type-Level Parameterization is Powerful

Evidence:

Fiete (Fly): 439 neurons, reduce to 57 parameters via cell types
Blue Brain (Rat): 207 morpho-electrical types
Billeh (Mouse): 17 excitatory + multiple inhibitory types

Why It Works:

Neurons of same type have similar:
- Ion channel distributions
- Time constants
- Synaptic properties
Developmental programs ensure within-type homogeneity

Practical Benefit:

Parameters: $O(\text{types}^2)$ instead of $O(\text{neurons}^2)$
Biologically interpretable
Generalizes across individuals

Principle 3: Emergent Computation from Structure + Local Nonlinearity

Examples:

Fly Motion Detection (Turaga):

Connectome wiring + dendritic nonlinearity → Direction selectivity
No need to explicitly program "motion detector"

C. elegans Locomotion (Zhao):

Connectome + neuromuscular coupling → Rhythmic swimming
Central pattern generator emerges from recurrent connectivity

Rat Cortex Oscillations (Blue Brain):

E-I balance from connectivity → Gamma oscillations (30-80 Hz)
No explicit oscillator needed

General Rule:

Structure (connectivity) sets up potential computations
Dynamics (ion channels, nonlinearities) realize them
Input triggers and shapes them

Principle 4: Recurrent Amplification is Ubiquitous

Observed In:

Fly optic lobe: Weak photoreceptor input amplified by recurrent Mi/Tm circuits
Mouse V1: Weak LGN input amplified 5-10× by recurrent cortical connections
C. elegans: Sensory neuron → interneuron amplification

Mechanism:

\text{Output} = \frac{\text{Input}}{1 - \text{Recurrent Gain}}

Implications:

Small changes in synaptic weights have large effects on activity
Network is poised near instability (for flexibility)
Inhibition is critical to prevent runaway excitation

Principle 5: Inhibitory Diversity is Functionally Critical

Evidence:

Mouse V1 (Billeh):

PV interneurons: Control gain (divisive)
SST interneurons: Provide normalization
VIP interneurons: Disinhibit (gate information flow)

Fly optic lobe (Borst):

Lateral inhibition for contrast enhancement
Feedforward inhibition for temporal filtering

C. elegans (Zhao):

GABAergic motor neurons for antagonist muscle inhibition

General Pattern:

Different inhibitory types target different compartments (soma vs dendrite)
Different temporal dynamics (fast vs slow)
Different circuit positions (feedforward vs feedback)

3. The "Connectome Ladder": Levels of Abstraction

Different modeling goals require different levels of detail:

Level	Connectome Info	Neuron Model	Example	Use Case
L1: Binary	Who connects to whom	Point neuron (LIF)	Potjans 2014	Network structure analysis
L2: Weighted	+ Synapse counts	Point neuron + types	Creamer C. elegans	Dynamics prediction (coarse)
L3: Biophysical	+ Spatial locations	Compartmental HH	Blue Brain	Emergent properties
L4: Functional	+ In vivo measurements	Mechanistic + data fit	Turaga Fly	Single-neuron prediction

Choosing the Right Level:

Research question determines required detail
Available data limits what's feasible
Computational cost trades off with accuracy

Trend: Moving up the ladder as data and compute improve

🔑 Cross-Species Insights

Common Principles Across Organisms

Aspect	Drosophila	C. elegans	Mouse
Connectome Completeness	✅ Full (FlyWire)	✅ Full	⚠️ Partial (1 mm³)
Neuron Count	~140,000	~302	~75 million (whole brain)
Neuron Model Complexity	Mechanistic point → Compartmental	Compartmental (simple)	Point (practical limit)
Synapse Type	Chemical (mostly)	Chemical + Gap junctions	Chemical (gap junctions less characterized)
Functional Data	Abundant (calcium imaging)	Abundant (whole-brain imaging)	Large-scale (MICrONS)
Connectome Predictive Power	High (~70-90%)	Moderate (~40-50%)	Moderate (~50-60%)
Key Challenge	Dendritic computations	Graded transmission, embodiment	Incomplete connectome, scale

Why Connectome Alone is Insufficient

All three organisms show the same pattern:

Connectome provides strong scaffold (30-50% variance explained)
Need physiological parameters:
- Synaptic weights vary across connections of same type
- Time constants, nonlinearities are cell-type specific
- Neuromodulation not captured in structure
Dynamics matter:
- Polysynaptic paths create functional connections without direct synapses
- Feedback loops amplify/suppress signals
- Temporal dynamics filter information

The Optimal Modeling Strategy (Synthesis)

Based on all reviewed papers:

Connectome Structure + Cell-Type Parameters + Functional Data → Accurate Model

Step-by-Step Recipe:

Start with connectome:
- Initialize connectivity matrix $\mathbf{W} \propto \mathbf{C}$
- Set signs from neurotransmitter predictions
Add cell-type biophysics:
- Time constants $\tau_{\text{type}}$
- Nonlinear activation functions
- Dendritic compartmentalization (if needed)
Parameterize at cell-type level (not individual synapses):
- Reduces parameters from millions to hundreds
- Biologically motivated (neurons of same type are similar)
Optimize using functional data:
- Neural recordings (calcium imaging, ephys)
- Behavioral data (for whole-brain models)
- Multi-objective optimization (match multiple features)
Validate with held-out data:
- New stimuli
- Lesion/perturbation experiments
- Different behavioral contexts

Future Directions

Technical:

Hybrid models: Combine connectome constraints with machine learning flexibility
Multi-scale: Link molecular, cellular, circuit, and behavioral levels
Incomplete connectomes: Methods to infer missing connections (as in mouse)

Biological:

Plasticity: Current models are static; add learning rules
Neuromodulation: Incorporate state-dependent parameter changes
Development: Model how connectomes wire up during development

Applications:

Drug discovery: Predict effects of pharmacological interventions
Disease modeling: Connectome changes in neurological disorders
Brain-inspired AI: Transfer principles to artificial neural networks

Summary Table: Key Papers at a Glance

Drosophila Models

Paper	Scale	Neuron Model	Connectome Use	Free Parameters	Key Innovation
Turaga 2024 ⭐️	60K neurons	Mechanistic point	Full FlyWire EM	~10K-100K	Single-neuron prediction (r=0.7-0.9)
Fiete 2025	439 neurons (HD circuit)	Point	Full FlyWire EM	57 (!)	Massive parameter reduction via cell types
Borst 2024	325 neurons (5 columns)	Conductance-based	Optic lobe connectivity	~1K	Temporal filtering cascade
Whole-brain LIF 2024	140K neurons	LIF	Full FlyWire EM	~1K	First whole-brain sensorimotor model

C. elegans Models

Paper	Scale	Neuron Model	Connectome Use	Free Parameters	Key Innovation
Zhao 2024 ⭐️	302 neurons + 95 muscles	Compartmental HH	Full + gap junctions	~10K-100K	Brain-body-environment closed loop
Morrison 2025	~30 neurons	Conductance-based	Premotor circuit	~100	Data-driven fit to calcium imaging
Creamer 2024	302 neurons	Linear dynamical system	Full connectome	302²	Quantifies connectome insufficiency

Mammalian Cortex Models

Paper	Organism	Scale	Neuron Model	Connectome Use	Free Parameters	Key Innovation
Blue Brain 2015 ⭐️	Rat	31K neurons, 37M synapses	Multi-compartmental HH	Statistical (touch-detection)	Millions	First mammalian cortical simulation
Billeh 2020 ⭐️	Mouse	230K neurons, 280M synapses	Hybrid (GLIF + detailed)	Mixed (real + inferred)	~100K	Large-scale V1 with cell type diversity
Potjans 2014	Generic	80K neurons	LIF	Statistical (8 populations)	~100	Canonical microcircuit benchmark
MICrONS	Mouse	100K neurons	Point (in models)	Partial EM (1 mm³)	~10K	Structure-function co-registration
Rajan 2020	Mouse	Multi-region	RNN	Inferred from function	1000s	CURBD: Effective connectivity

Theory & Principles

Paper	Focus	Key Contribution
Beiran & Litwin-Kumar 2024	Theoretical limits	Connectome alone has prediction floor; need weights + function
Cross-species synthesis	General principles	5 universal principles (see section)
Connectome Ladder	Abstraction levels	4-level framework for choosing model complexity

🎯 Synthesis: The Current State of Connectome-Based Modeling

Where We Are (2025)

Complete Connectomes Available:

✅ C. elegans (302 neurons, since 1986, continuously refined)
✅ Drosophila (140K neurons, FlyWire 2024)
⚠️ Mouse (Partial: 1 mm³ ~100K neurons, MICrONS 2025)
❌ Human (Not feasible with current technology)

Modeling Maturity:

Organism	Connectome	Neuron Models	Functional Data	Predictive Models	Behavioral Validation
Fly	⭐️⭐️⭐️ Complete	⭐️⭐️⭐️ Excellent	⭐️⭐️⭐️ Abundant	⭐️⭐️⭐️ High accuracy	⭐️⭐️ Good
C. elegans	⭐️⭐️⭐️ Complete	⭐️⭐️ Good	⭐️⭐️⭐️ Whole-brain imaging	⭐️⭐️ Moderate	⭐️⭐️⭐️ Excellent
Mouse	⭐️ Partial	⭐️⭐️⭐️ Excellent (Allen)	⭐️⭐️⭐️ Large-scale	⭐️⭐️ Moderate	⭐️ Limited
Rat	❌ None	⭐️⭐️⭐️ Excellent (BBP)	⭐️⭐️ Good	⭐️ Qualitative	⭐️ Limited

What We've Learned: The "Connectome Equation"

The field has converged on a consensus formula for predicting neural activity:

\boxed{\text{Neural Activity} = f(\underbrace{\text{Connectome}}_{\text{Structure}} + \underbrace{\text{Cell Types}}_{\text{Parameters}} + \underbrace{\text{Biophysics}}_{\text{Dynamics}} + \underbrace{\text{Input}}_{\text{Context}})}

Component Contributions (approximate variance explained):

Connectome alone: 30-50%
- Who connects to whom
- Sign (E/I) from neurotransmitter
+ Cell-type parameters: +20-30%
- Time constants
- Activation functions
- Channel distributions
+ Functional data: +10-20%
- Synaptic weight measurements
- In vivo activity constraints
Remaining (~10-20%):
- Neuromodulation
- Plasticity
- Stochasticity
- Unknown unknowns

Key Insight: Each component is necessary; none is sufficient alone.

The Connectome Taxonomy: What Type of Model Do You Need?

Research Goal
    ├── Understand network structure
    │   └── → Binary connectome + graph theory (L1)
    │
    ├── Predict coarse dynamics
    │   └── → Weighted connectome + LIF neurons (L2)
    │
    ├── Study emergent properties
    │   └── → Statistical connectome + HH neurons (L3, Blue Brain)
    │
    ├── Predict single-neuron responses
    │   └── → Full EM connectome + mechanistic models (L4, Turaga)
    │
    └── Design perturbation experiments
        └── → Hybrid models + functional data (L3.5, Billeh)

No single "best" approach — depends on question, data, and resources.

Outstanding Questions & Challenges

1. The Weight Problem:

Issue: Synaptic weights vary 10-100× even for same connection type
Current: Use cell-type averages (loses information)
Future: Measure weights at scale (voltage-sensitive dyes? functional inferences?)

2. The Completeness Problem (Mammals):

Issue: Mouse EM only 1 mm³ (0.02% of brain)
Workaround: Statistical reconstruction (Blue Brain) or partial + inference (MICrONS)
Future: Faster EM? Smarter interpolation methods?

3. The Dynamics Problem:

Issue: Connectome is static; brain is dynamic (plasticity, neuromodulation)
Current: Model snapshot in time
Future: Time-varying connectomes? Plasticity rules from data?

4. The Validation Problem:

Issue: Hard to conclusively validate complex models
Current: Match aggregate statistics
Future: Causal perturbations (optogenetics) to test predictions

5. The Interpretation Problem:

Issue: Model with millions of parameters is a "black box"
Current: Analyse emergent properties post-hoc
Future: Interpretable architectures? Mechanistic decomposition?

Emerging Trends (2024-2025)

1. Hybrid Models:

Mix EM connectomes (where available) + statistical reconstruction (gaps)
Mix detailed neurons (key cells) + simplified neurons (background)
Example: Billeh's V1 model

2. Multi-Modal Integration:

Connectome + transcriptomics + functional imaging
Predict connectivity from gene expression patterns
Example: MICrONS wiring rules

3. Whole-Organism Modeling:

Brain + body + environment closed loop
Example: C. elegans (Zhao), Fly locomotion (NeuroMechFly)
Next: Mouse reaching task?

4. GPU-Accelerated Simulation:

Real-time or faster-than-real-time simulation becoming feasible
Enables large-scale parameter sweeps
Example: JAX-based fly models

5. Foundation Models Meet Connectomes:

Use transformers trained on neural data + connectome constraints
Example: Tolias foundation model
Future: Hybrid mechanistic + data-driven?

Practical Recommendations for Researchers

If you want to build a connectome-based model:

Step 1: Define Your Question

What do you want to predict? (structure → function? perturbation → outcome?)
What level of detail is needed? (Use Connectome Ladder)

Step 2: Inventory Your Data

Connectome: Complete? Partial? Statistical?
Neuron types: How many? Well-characterized?
Functional data: Single-cell? Population? Behavioral?

Step 3: Choose Model Complexity

Match complexity to data (don't overfit!)
Start simple, add complexity if needed
Use cell-type level parameters (not individual neurons)

Step 4: Optimize Intelligently

Initialize from connectome + biology
Use multi-stage optimization (passive → active → network)
Constrain to biologically plausible ranges
Regularize to prevent overfitting

Step 5: Validate Rigorously

Hold out test data
Predict responses to novel stimuli
Test perturbations (if possible)
Check for biological realism (firing rates, correlations, etc.)

Step 6: Iterate

Models are hypotheses, not final answers
Use model predictions to design new experiments
Refine model based on new data
Rinse and repeat

The Big Picture: Why This Matters

Scientific Impact:

Mechanistic understanding: How structure gives rise to function
Testable predictions: Guide experiments efficiently
Integration platform: Unify disparate datasets
Perturbation lab: In silico experiments impossible in vivo

Technological Impact:

Brain-inspired AI: Transfer principles to artificial systems
Simulation technology: Advances in HPC, GPU computing
Data standards: SONATA, BMTK enable model sharing
Open science: Public models as community resources

Medical Impact (Future):

Disease modeling: Connectome changes in disorders
Drug discovery: Predict effects on circuits
Personalized medicine: Individual connectomes?
Neuroprosthetics: Biomimetic control algorithms

Future Vision (2025-2035)

Near-term (2-5 years):

✅ Multiple fly brain regions with single-neuron accuracy
✅ Complete mouse V1 column model (all cell types)
✅ C. elegans with learning and plasticity
⚠️ Human cortical column (statistical, Blue Brain-style)

Medium-term (5-10 years):

⚠️ Multiple interconnected mouse brain regions
⚠️ Drosophila whole-brain with full biophysics
⚠️ Human cortical area (partial EM + inference)
❓ Real-time brain simulation on neuromorphic hardware

Long-term (10-20 years):

❓ Mouse whole-brain (EM + statistical hybrid)
❓ Human cortical connectome (cm³ scale)
❓ "Digital twin" brains for medical applications
❓ Brain-scale neuromorphic computers

The Goal: Not to replace experimental neuroscience, but to complement it with computational models that:

Generate hypotheses
Integrate knowledge
Predict outcomes
Guide experiments

📚 Additional Resources

Software & Tools:

NEURON: Multi-compartmental neuron simulation
BluePyOpt: Parameter optimization framework
BMTK/SONATA: Large-scale network simulation
JAX: GPU-accelerated neural simulation
NetPyNE: Network modeling in Python

Databases:

FlyWire: Drosophila connectome
WormAtlas/OpenWorm: C. elegans
Allen Brain Atlas: Mouse cell types + connectivity
MICrONS: Mouse EM + functional data
Blue Brain Portal: Rat cortical models

Key Labs & Projects:

Janelia (Turaga, Branson, etc.): Fly connectomics + modeling
Allen Institute (Koch, Zeng, Tolias): Mouse cell types + networks
Blue Brain/EPFL (Markram): Mammalian cortex simulation
Columbia (Litwin-Kumar, Pillow): Theory + worm/fly models
Princeton (Leifer): C. elegans imaging + modeling

This concludes the comprehensive analysis of connectome-based neural network modeling. The field stands at an exciting juncture where complete connectomes, powerful computation, and rich functional data converge to enable unprecedented understanding of how brains work.

🧠 The connectome is not the end — it's the beginning of truly mechanistic neuroscience. 🚀

Connectome Inspired Neural Network

📑 Table of Contents

📚 Paper Collections by Organism

🔬 Detailed Analysis of Connectome-Based Modeling

🪰 Drosophila Models (Full EM Connectome)

🪱 C. elegans Models (First Complete Connectome)

🐭 Mouse/Rat Models (Partial EM + Statistical)

🧬 Theory & Principles

🔑 Cross-Species Insights

📊 Summary Tables

🎯 Synthesis & Future

📚 Resources

Paper Collections by Organism

Drosophila

Human

Perturbation

monkey

Rodent

MICrONS

C. Elegans

Dataset

Theory-Based

cognitive inspired

Others

potential model

Basic Architecture

Review

Researcher (TODO)

Detailed Analysis of Connectome-Based Modeling Approaches

Overview

🪰 Drosophila Connectome-Based Models

1. Turaga et al., 2024 - Connectome-Constrained Deep Mechanistic Networks ⭐️ Landmark Study

Background & Motivation

Connectome Data Utilization

Model Architecture

Parameter Optimization Strategy

Validation & Results

Comparison to Previous Approaches

Significance & Impact

2. Fiete et al., 2025 - Head Direction Circuit with Massive Parameter Reduction

The Parameter Reduction Problem

Model Formulation

Optimization Strategy

Results

Significance

3. Borst 2024 - Differential Temporal Filtering in Optic Lobe

Model Approach

Key Findings

4. Full Brain LIF Model (Nature 2024)

Scale & Ambition

Connectome Constraints

Parameter Optimization

Results & Insights

🪱 C. elegans Connectome-Based Models

1. Zhao et al., 2024 - Integrative Brain-Body-Environment Model ⭐️ Most Comprehensive

Connectome Data Integration

Multi-Scale Modeling Framework

Parameter Optimization Strategy

Validation & Results

Key Insights

Significance

2. Morrison & Young, 2025 - Data-Driven Premotor Network Model

Focus: Forward/Backward Locomotion Circuit

Model Details

Results

3. Creamer, Leifer & Pillow, 2024 - Bridging Connectome and Whole-Brain Activity

Key Question:

Approach

Optimization

Key Findings

🐭 Mouse Visual Cortex Connectome-Based Models

1. MICrONS Consortium, 2025 - Functional Connectomics ⭐️ Game-Changing Dataset

MICrONS Dataset Overview

Connectome Data Structure

Key Modeling Findings

2. Tolias et al., 2025 - Foundation Model of Neural Activity

Beyond Connectome: Data-Driven Foundation Model

Results

3. Rajan et al., 2020 - Data-Constrained RNNs (CURBD)

Approach: Reverse-Engineering Brain-Wide Dynamics