Faster Mixing of the Jerrum-Sinclair Chain
Abstract
We show that the Jerrum-Sinclair Markov chain on matchings mixes in time O(2 m) on any graph with n vertices, m edges, and maximum degree , for any constant edge weight λ>0. For general graphs with arbitrary, potentially unbounded , this provides the first improvement over the classic O(n2 m) mixing time bound of Jerrum and Sinclair (1989) and Sinclair (1992). To achieve this, we develop a general framework for analyzing mixing times, combining ideas from the classic canonical path method with the "local-to-global" approaches recently developed in high-dimensional expanders, introducing key innovations to both techniques.
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