Stable Adiabatic Times For A Continuous Evolution Of Markov Chains

Abstract

This paper continues the discussion on the stability of time-inhomogeneous Markov chains. In particular, this paper defines a time-inhomogeneous, discrete-time Markov chain governed by a continuous evolution in the appropriate martrix space. This matrix space, Pnia, is the space of all stochastic matrices that are irreducible and aperiodic. For this new type of evolution there is a definition of a specific type of stability called the stable adiabatic time. This measure is bounded by a function of the optimal mixing time over the evolution. Namely, for a time-inhomogeneous, discrete-time Markov chain governed by a continuous evolution through a function P: [0,1] → Pnia and 0 < ε < 12 n tsad(P, ε) ≤ 3n3 2 L tmix2(P∞, ε)(1-2n ε) ε where L is a Lipschitz constant related to the function P.