Covariation representations for Hermitian L\'evy process ensembles of free infinitely divisible distributions

Abstract

It is known that the so-called Bercovici-Pata bijection can be explained in terms of certain Hermitian random matrix ensembles (Md)d≥1 whose asymptotic spectral distributions are free infinitely divisible. We investigate Hermitian L\'evy processes with jumps of rank one associated to these random matrix ensembles introduced in [6] and [10]. A sample path approximation by covariation processes for these matrix L\'evy processes is obtained. As a general result we prove that any d× d complex matrix subordinator with jumps of rank one is the quadratic variation of an Cd-valued L\'evy process. In particular, we have the corresponding result for matrix subordinators with jumps of rank one associated to the random matrix ensembles (Md)d≥1