Some sets of first category in product Calder\'on-Lozanovski spaces on hypergroups
Abstract
Let K be a locally compact hypergroup with a left Haar measure μ and be a Banach ideal of μ-measurable complex-valued functions on K. For Young functions \i\i=1,2,3, let _i(K) be the corresponding Calder\'on--Lozanovski space associated with i on K. Motivated by the remarkable work of Akbarbaglu et al. in [Adv. Math. 312 (2017), 737-763], in this article, the authors give several sufficient conditions for the sets \(f,g)∈_1(K)×_2(K):\ |f| |g|∈_3(K)\ and \(f,g)∈_1(K)×_2(K):\ ∃\,x∈ U,\ (|f| |g|)(x)<∞\ to be of first category in the sense of Baire, where U⊂ K denotes a compact set. All these results are new even for Orlicz(-Lorentz) spaces on hypergroups.
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