English

Local Mixing Time: Distributed Computation and Applications

Distributed, Parallel, and Cluster Computing 2018-01-09 v1 Data Structures and Algorithms

Abstract

The mixing time of a graph is an important metric, which is not only useful in analyzing connectivity and expansion properties of the network, but also serves as a key parameter in designing efficient algorithms. We introduce a new notion of mixing of a random walk on a (undirected) graph, called local mixing. Informally, the local mixing with respect to a given node ss, is the mixing of a random walk probability distribution restricted to a large enough subset of nodes --- say, a subset of size at least n/βn/\beta for a given parameter β\beta --- containing ss. The time to mix over such a subset by a random walk starting from a source node ss is called the local mixing time with respect to ss. The local mixing time captures the local connectivity and expansion properties around a given source node and is a useful parameter that determines the running time of algorithms for partial information spreading, gossip etc. Our first contribution is formally defining the notion of local mixing time in an undirected graph. We then present an efficient distributed algorithm which computes a constant factor approximation to the local mixing time with respect to a source node ss in O~(τs)\tilde{O}(\tau_s) rounds, where τs\tau_s is the local mixing time w.r.t ss in an nn-node regular graph. This bound holds when τs\tau_s is significantly smaller than the conductance of the local mixing set (i.e., the set where the walk mixes locally); this is typically the interesting case where the local mixing time is significantly smaller than the mixing time (with respect to ss). We also present a distributed algorithm that computes the exact local mixing time in O~(τsD)\tilde{O}(\tau_s \mathcal{D}) rounds, where D=min{τs,D}\mathcal{D} =\min\{\tau_s, D\} and DD is the diameter of the graph. We further show that local mixing time tightly characterizes the complexity of partial information spreading.

Keywords

Cite

@article{arxiv.1801.01903,
  title  = {Local Mixing Time: Distributed Computation and Applications},
  author = {Anisur Rahaman Molla and Gopal Pandurangan},
  journal= {arXiv preprint arXiv:1801.01903},
  year   = {2018}
}

Comments

16 pages

R2 v1 2026-06-22T23:37:46.905Z