Criteria of Spectral Gap for Markov Operators

Abstract

Let (E, F,μ) be a probability space, and let P be a Markov operator on L2(μ) with 1 a simple eigenvalue such that μ P=μ (i.e. μ is an invariant probability measure of P). Then P:= 1 2 (P+P*) has a spectral gap, i.e. 1 is isolated in the spectrum of P, if and only if \|P\|τ:=R∞ μ(f2) 1μ(f(Pf-R)+)<1. This strengthens a conjecture of Simon and Hφegh-Krohn on the spectral gap for hyperbounded operators solved recently by L. Miclo in M. Consequently, for a symmetric, conservative, irreducible Dirichlet form on L2(μ), a Poincar\'e/log-Sobolev type inequality holds if and only if so does the corresponding defective inequality. Extensions to sub-Markov operators and non-conservative Dirichlet forms are also presented.