AUTHOR=Buice Michael A., Chow Carson C.

TITLE=Generalized activity equations for spiking neural network dynamics

JOURNAL=Frontiers in Computational Neuroscience

VOLUME=7

YEAR=2013

URL=https://www.frontiersin.org/journals/computational-neuroscience/articles/10.3389/fncom.2013.00162

DOI=10.3389/fncom.2013.00162

ISSN=1662-5188

ABSTRACT=<p>Much progress has been made in uncovering the computational capabilities of spiking neural networks. However, spiking neurons will always be more expensive to simulate compared to rate neurons because of the inherent disparity in time scales—the spike duration time is much shorter than the inter-spike time, which is much shorter than any learning time scale. In numerical analysis, this is a classic stiff problem. Spiking neurons are also much more difficult to study analytically. One possible approach to making spiking networks more tractable is to augment mean field activity models with some information about spiking correlations. For example, such a generalized activity model could carry information about spiking rates and correlations between spikes self-consistently. Here, we will show how this can be accomplished by constructing a complete formal probabilistic description of the network and then expanding around a small parameter such as the inverse of the number of neurons in the network. The mean field theory of the system gives a rate-like description. The first order terms in the perturbation expansion keep track of covariances.</p>