Growth and decay of H\"older moduli

Abstract

If f: Rd C is bounded and f's H\"older α-modulus of continuity grows no faster than (1+ x)M (M≥0) then, for every ε>0, there is a β>0 such that f's H\"older β-modulus grows no faster than (1+ x)ε. We use this easy fact to show that, if f decays as fast as (1+ x)-R (for R>0) and f's α-H\"older modulus grows no faster than (1+ x)M, then, for every 0≤ R'< R, there is a β>0 such that f's β-H\"older modulus decays as fast as (1+ x)-R'. We apply this to strengthen a result of Coifman and Meyer on almost-orthogonality of vaguelet families and to derive other useful facts about vaguelets and vaguelet-like functions.