Entropy numbers of finite dimensional mixed-norm balls and function space embeddings with small mixed smoothness

Abstract

We study the embedding id: pb(qd) rb(ud) and prove matching bounds for the entropy numbers ek(id) provided that 0<p<r≤ ∞ and 0<q≤ u≤ ∞. Based on this finding, we establish optimal dimension-free asymptotic rates for the entropy numbers of embeddings of Besov and Triebel-Lizorkin spaces of small dominating mixed smoothness which settles an open question in the literature. Both results rely on a novel covering construction recently found by Edmunds and Netrusov.