Geometric bounds on the fastest mixing Markov chain

IF 1.5 1区 数学 Q2 STATISTICS & PROBABILITY Probability Theory and Related Fields Pub Date : 2024-01-30 DOI:10.1007/s00440-023-01257-x
Sam Olesker-Taylor, Luca Zanetti
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Abstract

In the Fastest Mixing Markov Chain problem, we are given a graph \(G = (V, E)\) and desire the discrete-time Markov chain with smallest mixing time \(\tau \) subject to having equilibrium distribution uniform on V and non-zero transition probabilities only across edges of the graph. It is well-known that the mixing time \(\tau _\textsf {RW}\) of the lazy random walk on G is characterised by the edge conductance \(\Phi \) of G via Cheeger’s inequality: \(\Phi ^{-1} \lesssim \tau _\textsf {RW} \lesssim \Phi ^{-2} \log |V|\). Analogously, we characterise the fastest mixing time \(\tau ^\star \) via a Cheeger-type inequality but for a different geometric quantity, namely the vertex conductance \(\Psi \) of G: \(\Psi ^{-1} \lesssim \tau ^\star \lesssim \Psi ^{-2} (\log |V|)^2\). This characterisation forbids fast mixing for graphs with small vertex conductance. To bypass this fundamental barrier, we consider Markov chains on G with equilibrium distribution which need not be uniform, but rather only \(\varepsilon \)-close to uniform in total variation. We show that it is always possible to construct such a chain with mixing time \(\tau \lesssim \varepsilon ^{-1} ({\text {diam}} G)^2 \log |V|\). Finally, we discuss analogous questions for continuous-time and time-inhomogeneous chains.

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最快混合马尔可夫链的几何边界
在最快混合马尔可夫链问题中,我们给定了一个图(G = (V, E)),并希望得到混合时间最小的离散时间马尔可夫链,条件是均衡分布均匀分布在 V 上,并且图的边上的过渡概率不为零。众所周知,通过切格不等式,G 上懒惰随机游走的混合时间由 G 的边传导性(\\Phi \)表征:\(\Phi ^{-1} \lesssim \tau _\textsf {RW} \lesssim \Phi ^{-2} \log |V||)。类似地,我们通过一个切格型不等式来描述最快混合时间:(\(\Psi ^{-1} \lesssim \tau ^^\star \lesssim \Psi ^{-2} (\log |V|)^2/)。这一特性禁止了具有小顶点传导性的图的快速混合。为了绕过这个基本障碍,我们考虑了 G 上的马尔可夫链,它的均衡分布不需要是均匀的,而只需要在总变化上接近于均匀。我们证明,总是有可能构造出这样一个混合时间为 \(\tau \lesssim \varepsilon ^{-1} ({\text {diam}} G)^2 \log |V|\)的链。最后,我们讨论连续时间链和时间同构链的类似问题。
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来源期刊
Probability Theory and Related Fields
Probability Theory and Related Fields 数学-统计学与概率论
CiteScore
3.70
自引率
5.00%
发文量
71
审稿时长
6-12 weeks
期刊介绍: Probability Theory and Related Fields publishes research papers in modern probability theory and its various fields of application. Thus, subjects of interest include: mathematical statistical physics, mathematical statistics, mathematical biology, theoretical computer science, and applications of probability theory to other areas of mathematics such as combinatorics, analysis, ergodic theory and geometry. Survey papers on emerging areas of importance may be considered for publication. The main languages of publication are English, French and German.
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