Restrictions of H\"older continuous functions

Abstract

For 0<α<1 let V(α) denote the supremum of the numbers v such that every α-H\"older continuous function is of bounded variation on a set of Hausdorff dimension v. Kahane and Katznelson (2009) proved the estimate 1/2 ≤ V(α)≤ 1/(2-α) and asked whether the upper bound is sharp. We show that in fact V(α)=\1/2,α\. Let H and M denote the Hausdorff and upper Minkowski dimension, respectively. The upper bound on V(α) is a consequence of the following theorem. Let \B(t): t∈ [0,1]\ be a fractional Brownian motion of Hurst index α. Then, almost surely, there exists no set A⊂ [0,1] such that M A>\1-α,α\ and B A R is of bounded variation. Furthermore, almost surely, there exists no set A⊂ [0,1] such that M A>1-α and B A R is β-H\"older continuous for some β>α. The zero set and the set of record times of B witness that the above theorems give the optimal dimensions. We also prove similar restriction theorems for deterministic self-affine functions and generic α-H\"older continuous functions. Finally, let \B(t): t∈ [0,1]\ be a two-dimensional Brownian motion. We prove that, almost surely, there is a compact set D⊂ [0,1] such that H D≥ 1/3 and B D R2 is non-decreasing in each coordinate. It remains open whether 1/3 is best possible.