L\'evy processes, martingales, reversed martingales and orthogonal polynomials

Abstract

We study class of L\'evy processes having distributions being indentifiable by moments. We define system of polynomial martingales \ Mn(Xt,t),F≤ t\ n≥ 1, where % F≤ t is a suitable filtration defined below. We present several properties of these martingales. Among others we show that % M1(Xt,t)/t is a reversed martingale as well as a harness. Main results of the paper concern the question if martingale say Mi multiplied by suitable determinstic function μ i(t) is a reversed martingale. We show that for n≥ 3 Mn(Xt,t) is a reversed martingale (or orthogonal polynomial) only when the L\'evy process in question is Gaussian (i.e. is a Wiener process). We study also a more general question if there are chances for a linear combination (with coefficients depending on t) of martingales Mi, i = 1,… ,n to be reversed martingales. We analyze case % n = 2 in detail listing all possible cases.