Sharp maximal Lp-estimates for martingales

Abstract

Let X be a supermartingale starting from 0 which has only nonnegative jumps. For each 0<p<1 we determine the best constants cp, Cp and cp such that \,\,\,\,t≥ 0||Xt||p≤ Cp||-∈ft≥ 0Xt||p, \,\,||t≥ 0Xt||p≤ cp||-∈ft≥ 0Xt||p and ||t≥ 0|Xt|\;||p≤ cp||-∈ft≥ 0Xt||p. The estimates are shown to be sharp if X is assumed to be a stopped one-dimensional Brownian motion. The inequalities are deduced from the existence of special functions, enjoying certain majorization and convexity-type properties. Some applications concerning harmonic functions on Euclidean domains are indicated.