Optimal uniform approximation of L\'evy processes on Banach spaces with finite variation processes

Abstract

For a general c\`adl\`ag L\'evy process on a separable Banach space V we estimate values of ∈fY∈ AX E\ ( X - Y ∞) + TV(Y[0,T]) \, where AX is the family of processes on V adapted to the natural filtration of X, has polynomial growth and TV(Y[0,T]) denotes the total variation of the process Y on the interval [0,T]. Next, we apply obtained estimates in three specific cases: a Brownian motion with drift on R, a standard Brownian motion on Rd and a symmetric α-stable process (α∈(1,2)) on R.