Nonlinear Piecewise Polynomial Approximation and Multivariate BV spaces of a Wiener--L.~Young Type. I

Abstract

The named space denoted by Vpqk consists of Lq functions on [0,1)d of bounded p-variation of order k∈ N. It generalizes the classical spaces Vp(0,1) (=Vp∞1) and BV([0,1)d) (V1q1 where q:= dd-1) and closely relates to several important smoothness spaces, e.g., to Sobolev spaces over Lp, BV and BMO and to Besov spaces. The main approximation result concerns the space Vpqk of smoothness s:=d(1p-1q)∈(0,k]. It asserts the following: Let f∈ Vpqk are of smoothness s∈(0,k] and N∈ N. There exist a family N of N dyadic subcubes of [0,1)d and a piecewise polynomial gN over N of degree k-1 such that \[ \|f-gN\|q≤slant CN-s/d|f|Vpqk. \] This implies the similar results for the above mentioned smoothness spaces, in particular, solves the going back to the 1967 Birman--Solomyak paper BS problem of approximation of functions from Wpk([0,1)d) in Lq([0,1)d) when ever kd=1p-1q and q<∞.