Abstract Lorentz spaces and K\"othe duality

Abstract

Given a fully symmetric Banach function space E and a decreasing positive weight w on I = (0, a), 0 < a ∞ , the generalized Lorentz space E,w is defined as the symmetrization of the canonical copy Ew of E on the measure space associated with the weight. If E is an Orlicz space then E,w is an Orlicz-Lorentz space. An investigation of the K\"othe duality of these classes is developed that is parallel to preceding works on Orlicz-Lorentz spaces. First a class of functions ME,w, which does not need to be even a linear space, is similarly defined as the symmetrization of the space w.Ew. Let also QE,w be the smallest fully symmetric Banach function space containing ME,w. Then the K\"othe dual of the class ME,w is identified as the Lorentz space E',w, while the K\"othe dual of E,w is QE',w. The space QE,w is also characterized in terms of Halperin's level functions. These results are applied to concrete Banach function spaces. In particular the K\"othe duality of Orlicz-Lorentz spaces is revisited at the light of the new results.