K\"othe-Herz Spaces: The Amalgam-Type Spaces of Infinite Direct Sums

Abstract

In this paper, we introduce a class of function spaces called K\"othe-Herz spaces E(X). These spaces are similar to amalgam spaces and are characterized by a local component given by a countable family X=( Xα ) α ∈ I of quasi-normed function spaces, and a global component E, which is a quasi-normed sequence space. We investigate various geometric and topological properties inherited by E(X) from its components, such as their completeness, duality, order continuity, ideal and Fatou properties, in an abstract setting. In addition, we provide a Banach function space characterization for E(X), which allows us to understand its structure and behavior more deeply. Furthermore, by appropriate amalgamation of Lorentz spaces (Orlicz spaces) and Lebesgue sequence spaces, we define Lorentz-Herz spaces (Orlicz-Herz spaces) as a particular case of E(X), which are still generalizations of the classical Herz spaces. In this context (especially Lorentz-Herz spaces), we establish previously studied properties, demonstrate interpolation results, and prove the boundedness of important sublinear integral operators with kernels that satisfy a size condition.