Convergence of Markovian Stochastic Approximation with discontinuous dynamics

Abstract

This paper is devoted to the convergence analysis of stochastic approximation algorithms of the form θ\n+1 = θ\n + γ\n+1 H\θ\n(X\n+1) where \θ\nn, n ≥ 0\ is a Rd-valued sequence, \γ, n ≥ 0\ is a deterministic step-size sequence and \X\n, n ≥ 0\ is a controlled Markov chain. We study the convergence under weak assumptions on smoothness-in-θ of the function θ H\θ(x). It is usually assumed that this function is continuous for any x; in this work, we relax this condition. Our results are illustrated by considering stochastic approximation algorithms for (adaptive) quantile estimation and a penalized version of the vector quantization.