The argmin process of random walks, Brownian motion and L\'evy processes

Abstract

In this paper we investigate the argmin process of Brownian motion B defined by αt:=\s ∈ [0,1]: Bt+s=u ∈ [0,1]Bt+u \ for t ≥ 0. The argmin process α is stationary,with invariant measure which is arcsine distributed. We prove that (αt; t ≥ 0) is a Markov process with the Feller property, and provide its transition kernel Qt(x,·) for t>0 and x ∈ [0,1]. Similar results for the argmin process of random walks and L\'evy processes are derived. We also consider Brownian extrema of a given length. We prove that these extrema form a delayed renewal process with an explicit path construction. We also give a path decomposition for Brownian motion at these extrema