Multifractal properties of typical convex functions

Abstract

We study the singularity (multifractal) spectrum of continuous convex functions defined on [0,1]d. Let Ef(h) be the set of points at which f has a pointwise exponent equal to h. We first obtain general upper bounds for the Hausdorff dimension of these sets Ef(h), for all convex functions f and all h≥ 0. We prove that for typical/generic (in the sense of Baire) continuous convex functions f:[0,1]d R , one has Ef(h) =d-2+h for all h∈[1,2], and in addition, we obtain that the set Ef(h ) is empty if h∈ (0,1) (1,+∞). Also, when f is typical, the boundary of [0,1]d belongs to Ef(0).