On restrictions of Besov functions

Abstract

In this paper, we study the smoothness of restrictions of Besov functions. It is known that for any f∈ B\p,qs(RN) with q≤ p we have f(·,y)∈ B\p,qs(Rd) for a.e. y∈ RN-d. We prove that this is no longer true when p\<q. Namely, we construct a function f∈ B\p,qs(RN) such that f(·,y) B\p,qs(Rd) for a.e. y∈ RN-d. We show that, in fact, f(·,y) belong to B\p,q(s,)(Rd) for a.e. y∈RN-d, a Besov space of generalized smoothness, and, when q=∞, we find the optimal condition on the function for this to hold. The natural generalization of these results to Besov spaces of generalized smoothness is also investigated.