BMO functions and Carleson measures with values in uniformly convex spaces

Abstract

This paper studies the relationship between vector-valued BMO functions and the Carleson measures defined by their gradients. Let dA and dm denote Lebesgue measures on the unit disc D and the unit circle T, respectively. For 1< q<∞ and a Banach space B we prove that there exists a positive constant c such that z0∈ D∫D(1-|z|)q-1\|∇ f(z)\|q Pz0(z) dA(z) cqz0∈ D∫\|f(z)-f(z0)\|qPz0(z) dm(z) holds for all trigonometric polynomials f with coefficients in B iff B admits an equivalent norm which is q-uniformly convex, where Pz0(z)=1-|z0|2|1-z0z|2 . The validity of the converse inequality is equivalent to the existence of an equivalent q-uniformly smooth norm.