Basic functional properties of certain scale of rearrangement-invariant spaces

Abstract

Let X be a rearrangement-invariant space over a non-atomic σ-finite measure space (R,μ) and let α∈(0,∞). We define the functional equation* \|f\|X α = \|((|f|α)**)1α\|X(0,μ(R)), equation* in which f is a μ-measurable scalar function defined on (R,μ) and X(0,μ(R)) is the representation space of X. We denote by X α the collection of all almost everywhere finite functions f such that \|f\|X α is finite. These spaces recently surfaced in connection of optimality of target function spaces in general Sobolev embeddings involving upper Ahlfors regular measures. We present a variety of results on these spaces including their basic functional properties, their relations to customary function spaces and mutual embeddings and, in a particular situation, a characterization of their associate structures. We discover a new one-parameter path of function spaces leading from a Lebesgue space to a Zygmund class and we compare it to the classical one.