Exactly solvable statistical physics models for large neuronal populations
Abstract
Maximum entropy methods provide a principled path connecting measurements of neural activity directly to statistical physics models, and this approach has been successful for populations of neurons. As increases in new experiments, we enter an undersampled regime where we have to choose which observables should be constrained in the maximum entropy construction. The best choice is the one that provides the greatest reduction in entropy, defining a "minimax entropy" principle. This principle becomes tractable if we restrict attention to correlations among pairs of neurons that link together into a tree; we can find the best tree efficiently, and the underlying statistical physics models are exactly solved. We use this approach to analyze experiments on neurons in the mouse hippocampus, and show that the resulting model captures the distribution of synchronous activity in the network.
Keywords
Cite
@article{arxiv.2310.10860,
title = {Exactly solvable statistical physics models for large neuronal populations},
author = {Christopher W. Lynn and Qiwei Yu and Rich Pang and William Bialek and Stephanie E. Palmer},
journal= {arXiv preprint arXiv:2310.10860},
year = {2023}
}
Comments
6 pages, 5 figures