The Critical Smoothness of Generalized Functions

Abstract

For each integrability parameter p ∈ (0,∞], the critical smoothness of a periodic generalized function f, denoted by sf(p) is the supremum over the smoothness parameters s for which f belongs to the Besov space Bp,ps (or other similar function spaces). This paper investigates the evolution of the critical smoothness with respect to the integrability parameter p. Our main result is a simple characterization of all the possible critical smoothness functions p sf(p) when f describes the space of generalized periodic functions. We moreover characterize the compressibility of generalized periodic functions in wavelet bases from the knowledge of their critical smoothness function.