H\"older--Zygmund classes on smooth curves

Abstract

We prove that a function in several variables is in the local Zygmund class Zm,1 if and only if its composite with every smooth curve is of class Zm,1. This complements the well-known analogous result for local H\"older--Lipschitz classes Cm,α which we reprove along the way. We demonstrate that these results generalize to mappings between Banach spaces and use them to study the regularity of the superposition operator f* : g f g acting on the global Zygmund space m+1( Rd). We prove that, for all integers m,k 1, the map f* : m+1( Rd) m+1( Rd) is of Lipschitz class Ck-1,1 if and only if f ∈ Zm+k,1( R).