How smooth are restrictions of Besov functions?

Abstract

In a previous work, we showed that Besov spaces do not enjoy the restriction property unless q≤ p. Specifically, we proved that if p<q, then it is always possible to construct a function f∈ Bp,qs(RN) such that f(·,y) Bp,qs(Rd) for a.e. y∈ RN-d, while this "pathology" does not happen if q≤ p. We showed that the partial maps belong, in fact, to the Besov space of generalised smoothness Bp,q(s,)(Rd) provided the function satisfies a simple summability condition involving p and q. This short note completes the picture by showing that this characterisation is sharp.