On convex hull and winding number of self similar processes

Abstract

It is well known that for a standard Brownian motion (BM) \B(t), \;t ≥ 0\ with values in Rd, its convex hull V(t)= \\\,B(s),\;s ≤ t \ with probability 1 for each t > 0 contains 0 as an interior point (see Evans (1985)). We also know that the winding number of a typical path of a 2-dimensional BM is equal to +∞. The aim of this article is to show that these properties aren't specifically "Brownian", but hold for a much larger class of d-dimensional self similar processes. This class contains in particular d-dimensional fractional Brownian motions and (concerning convex hulls) strictly stable Levy processes.