Lebesgue and Hardy spaces for symmetric norms I

Abstract

In this paper, we define and study a class Rc of norms on L∞( T) , called continuous\ rotationally\ symmetric \ norms, which properly contains the class \ · p:1≤ p<∞ \ . For α ∈ R% c we define Lα( T) and the Hardy space Hα( T) , and we extend many of the classical results, including the dominated convergence theorem, convolution theorems, dual spaces, Beurling-type invariant spaces, inner-outer factorizations, characterizing the multipliers and the closed densely-defined operators commuting with multiplication by z. We also prove a duality theorem for a version of Lα in the setting of von Neumann algebras.