Increment stationarity of L2-indexed stochastic processes: spectral representation and characterization

Abstract

We are interested in the increment stationarity property for L2-indexed stochastic processes, which is a fairly general concern since many random fields can be interpreted as the restriction of a more generally defined L2-indexed process. We first give a spectral representation theorem in the sense of Ito54, and see potential applications on random fields, in particular on the L2-indexed extension of the fractional Brownian motion. Then we prove that this latter process is characterized by its increment stationarity and self-similarity properties, as in the one-dimensional case.