Local behavior of traces of Besov functions: Prevalent results

Abstract

Let 1 ≤ d < D and (p,q,s) satisfying 0 < p < ∞, 0 < q ≤ ∞, 0 < s-d/p < ∞. In this article we study the global and local regularity properties of traces, on affine subsets of D, of functions belonging to the Besov space Bsp,q(D). Given a d-dimensional subspace H ⊂ D, for almost all functions in Bsp,q(D) (in the sense of prevalence), we are able to compute the singularity spectrum of the traces fa of f on affine subspaces of the form a+H, for Lebesgue-almost every a ∈ D-d. In particular, we prove that for Lebesgue-almost every a ∈ D-d, these traces fa are more regular than what could be expected from standard trace theorems, and that fa enjoys a multifractal behavior.