English

$L^2$-Quasi-compact and hyperbounded Markov operators

Probability 2022-06-17 v1

Abstract

A Markov operator PP on a probability space (S,Σ,μ)(S,\Sigma,\mu), with μ\mu invariant, is called {\it hyperbounded} if for some 1p<q1 \le p<q \le \infty it maps (continuously) LpL^p into LqL^q. We deduce from a recent result of Gl\"uck that a hyperbounded PP is quasi-compact, hence uniformly ergodic, in all Lr(S,μ)L^r(S,\mu), 1<r<1<r< \infty. We prove, using a method similar to Foguel's, that a hyperbounded Markov operator has periodic behavior similar to that of Harris recurrent operators, and for the ergodic case obtain conditions for aperiodicity. Given a probability ν\nu on the unit circle, we prove that if the convolution operator Pνf:=νfP_\nu f:=\nu*f is hyperbounded, then ν\nu is atomless. We show that there is ν\nu absolutely continuous such that PνP_\nu is not hyperbounded, and there is ν\nu with all powers singular such that PνP_\nu is hyperbounded. As an application, we prove that if PνP_\nu is hyperbounded, then for any sequence (nk)(n_k) of distinct positive integers with bounded gaps, (nkx)(n_kx) is uniformly distributed mod 1 for ν\nu almost every xx (even when ν\nu is singular).

Keywords

Cite

@article{arxiv.2206.08003,
  title  = {$L^2$-Quasi-compact and hyperbounded Markov operators},
  author = {Guy Cohen and Michael lin},
  journal= {arXiv preprint arXiv:2206.08003},
  year   = {2022}
}
R2 v1 2026-06-24T11:53:22.936Z