Self-stabilizing processes

Abstract

We construct `self-stabilizing' processes Z(t), t ∈ [t0,t1). These are random processes which when `localized', that is scaled around t to a fine limit, have the distribution of an α(Z(t))-stable process, where α is some given function on R. Thus the stability index at t depends on the value of the process at t. Here we address the case where α: R (0,1). We first construct deterministic functions which satisfy a kind of autoregressive property involving sums over a plane point set . Taking to be a Poisson point process then defines a random pure jump process, which we show has the desired localized distributions.