English

Polynomial deviation bounds for recurrent Harris processes having general state space

Probability 2011-09-21 v2

Abstract

Consider a strong Markov process in continuous time, taking values in some Polish state space. Recently, Douc, Fort and Guillin (2009) introduced verifiable conditions in terms of a supermartingale property implying an explicit control of modulated moments of hitting times. We show how this control can be translated into a control of polynomial moments of abstract regeneration times which are obtained by using the regeneration method of Nummelin, extended to the time-continuous context. As a consequence, if a pp-th moment of the regeneration times exists, we obtain non asymptotic deviation bounds of the form Pν(1t0tf(Xs)dsμ(f))K(p)1tp112(p1)f2(p1),p2.P_{\nu}(|\frac1t\int_0^tf(X_s)ds-\mu(f)|\geq\ge)\leq K(p)\frac1{t^{p- 1}}\frac 1{\ge^{2(p-1)}}\|f\|_\infty^{2(p-1)}, p \geq 2. Here, ff is a bounded function and μ\mu is the invariant measure of the process. We give several examples, including elliptic stochastic differential equations and stochastic differential equations driven by a jump noise.

Keywords

Cite

@article{arxiv.1103.5610,
  title  = {Polynomial deviation bounds for recurrent Harris processes having general state space},
  author = {Eva Loecherbach and Dasha Loukianova},
  journal= {arXiv preprint arXiv:1103.5610},
  year   = {2011}
}
R2 v1 2026-06-21T17:46:10.107Z