Approximation order of Kolmogorov, Gel'fand, and linear widths for Sobolev embeddings in euclidian measure spaces

Abstract

In this paper we completely solve the problem of finding the (upper) approximation order with respect to the Kolmogorov, Gel'fand, and linear widths for the embedding of the Sobolev spaces Wα,p and W0α,p in the euclidian measure spaces Lq for an arbitrary Borel probability measure with support contained in the open m-dimensional unit cube and for all possible choices of 1≤ p,q≤∞. We will determine the exact values for the various upper approximation orders in terms of the Lq-spectrum of only and finally give sufficient conditions imposed on the regularity of the Lq-spectrum for the approximation orders to exist. We also elucidate some intrinsic connections between the concept of approximation order and the fractal geometric notion of the upper and lower Minkowski dimension of the support of .