Entropy Contractions in Markov Chains: Half-Step, Full-Step and Continuous-Time

Pietro Caputo, Zongchen Chen, Yuzhou Gu, Yury Polyanskiy
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Abstract

This paper considers the speed of convergence (mixing) of a finite Markov kernel $P$ with respect to the Kullback-Leibler divergence (entropy). Given a Markov kernel one defines either a discrete-time Markov chain (with the $n$-step transition kernel given by the matrix power $P^n$) or a continuous-time Markov process (with the time-$t$ transition kernel given by $e^{t(P-\mathrm{Id})}$). The contraction of entropy for $n=1$ or $t=0+$ are characterized by the famous functional inequalities, the strong data processing inequality (SDPI) and the modified log-Sobolev inequality (MLSI), respectively. When $P=KK^*$ is written as the product of a kernel and its adjoint, one could also consider the ``half-step'' contraction, which is the SDPI for $K$, while the ``full-step'' contraction refers to the SDPI for $P$. The work [DMLM03] claimed that these contraction coefficients (half-step, full-step, and continuous-time) are generally within a constant factor of each other. We disprove this and related conjectures by working out a number of different counterexamples. In particular, we construct (a) a continuous-time Markov process that contracts arbitrarily faster than its discrete-time counterpart; and (b) a kernel $P$ such that $P^{m+1}$ contracts arbitrarily better than $P^m$. Hence, our main conclusion is that the four standard inequalities comparing five common notions of entropy and variance contraction are generally not improvable. In the process of analyzing the counterexamples, we survey and sharpen the tools for bounding the contraction coefficients and characterize properties of extremizers of the respective functional inequalities. As our examples range from Bernoulli-Laplace model, random walks on graphs, to birth-death chains, the paper is also intended as a tutorial on computing MLSI, SDPI and other constants for these types of commonly occurring Markov chains.
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马尔可夫链中的熵收缩:半步、全步和连续时间
本文探讨了有限马尔可夫核 $P$ 与库尔贝克-莱布勒发散(熵)的收敛(混合)速度。给定马尔可夫核,可以定义离散时间马尔可夫链(其$n$步过渡核由矩阵幂$P^n$给出)或连续时间马尔可夫过程(其时间-$t$过渡核由$e^{t(P-\mathrm{Id})}$给出)。当 $P=KK^*$ 被写成核及其矢量的乘积时,我们还可以考虑 "半步 "收缩,即 $K$ 的 SDPI,而 "全步 "收缩指的是 $P$ 的 SDPI。工作[DMLM03]声称,这些收缩系数(半步、全步和连续时间)通常在一个常数因子范围内。我们通过一系列不同的反例证明了这一猜想及相关猜想。特别是,我们构建了(a)一个连续时间马尔可夫过程,其收缩速度任意快于其离散时间对应过程;以及(b)一个核$P$,使得$P^{m+1}$的收缩速度任意优于$P^m$。因此,我们的主要结论是,比较熵和方差收缩的五个常见概念的四个标准不等式一般是无法改进的。在分析反例的过程中,我们考察并改进了约束收缩系数的工具,并描述了各自函数不等式的求极限者的性质。由于我们的例子涵盖了从伯努利-拉普拉斯模型、图上的随机漫步到出生-死亡链等各种类型,因此本文也可作为计算这些常见马尔可夫链的 MLSI、SDPI 和其他常数的教程。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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