On a Class of Gibbs Sampling over Networks

TL;DR

This paper develops a Gibbs sampling framework for structured distributions over networks, providing the first non-asymptotic convergence analysis for such methods in this context.

Contribution

It introduces an efficient Gibbs sampling method for bipartite network-structured distributions with proven linear convergence rates, extending prior work to more complex network structures.

Findings

Established a non-asymptotic linear convergence rate for the Gibbs sampler.

Extended analysis from simple two-node graphs to bipartite networks.

Potential application to distributed sampling from complex distributions.

Abstract

We consider the sampling problem from a composite distribution whose potential (negative log density) is $\sum_{i=1}^n f_i(x_i)+\sum_{j=1}^m g_j(y_j)+\sum_{i=1}^n\sum_{j=1}^m\frac{\sigma_{ij}}{2\eta} \Vert x_i-y_j \Vert^2_2$ where each of $x_i$ and $y_j$ is in $\mathbb{R}^d$, $f_1, f_2, \ldots, f_n, g_1, g_2, \ldots, g_m$ are strongly convex functions, and $\{\sigma_{ij}\}$ encodes a network structure. % motivated by the task of drawing samples over a network in a distributed manner. Building on the Gibbs sampling method, we develop an efficient sampling framework for this problem when the network is a bipartite graph. More importantly, we establish a non-asymptotic linear convergence rate for it. This work extends earlier works that involve only a graph with two nodes \cite{lee2021structured}. To the best of our knowledge, our result represents the first non-asymptotic analysis of a Gibbs sampler for structured log-concave distributions over networks. Our framework can be potentially used to sample from the distribution $ \propto \exp(-\sum_{i=1}^n f_i(x)-\sum_{j=1}^m g_j(x))$ in a distributed manner.