Approximating nonlinear functions with latent boundaries in low-rank excitatory-inhibitory spiking networks

TL;DR

This paper introduces a novel framework for spike-based computation in low-rank excitatory-inhibitory spiking networks, modeling neurons as boundaries in a low-dimensional space to approximate complex nonlinear functions.

Contribution

It presents a new boundary-based approach to understanding spike-based computation in low-rank EI networks, linking neural thresholds to input-output mappings.

Findings

Networks can approximate arbitrary nonlinear functions.

Properties include noise suppression, amplification, and irregular activity.

Inhibition-stabilized dynamics emerge from boundary interactions.

Abstract

Deep feedforward and recurrent rate-based neural networks have become successful functional models of the brain, but they neglect obvious biological details such as spikes and Dale's law. Here we argue that these details are crucial in order to understand how real neural circuits operate. Towards this aim, we put forth a new framework for spike-based computation in low-rank excitatory-inhibitory spiking networks. By considering populations with rank-1 connectivity, we cast each neuron's spiking threshold as a boundary in a low-dimensional input-output space. We then show how the combined thresholds of a population of inhibitory neurons form a stable boundary in this space, and those of a population of excitatory neurons form an unstable boundary. Combining the two boundaries results in a rank-2 excitatory-inhibitory (EI) network with inhibition-stabilized dynamics at the intersection of the two boundaries. The computation of the resulting networks can be understood as the difference of two convex functions and is thereby capable of approximating arbitrary non-linear input-output mappings. We demonstrate several properties of these networks, including noise suppression and amplification, irregular activity and synaptic balance, as well as how they relate to rate network dynamics in the limit that the boundary becomes soft. Finally, while our work focuses on small networks (5-50 neurons), we discuss potential avenues for scaling up to much larger networks. Overall, our work proposes a new perspective on spiking networks that may serve as a starting point for a mechanistic understanding of biological spike-based computation.