Author:
Foralewski Paweł,Hudzik Henryk,Kolwicz Paweł
Abstract
AbstractIn this paper, we introduce the notion of a quasimodular and we prove that the respective Minkowski functional of the unit quasimodular ball becomes a quasinorm. In this way, we refer to and complete the well-known theory related to the notions of a modular and a convex modular that lead to the F-norm and to the norm, respectively. We use the obtained results to consider the basic properties of quasinormed Calderón–Lozanovskiĭ spaces $E_{\varphi}$
E
φ
, where the lower Matuszewska–Orlicz index $\alpha _{\varphi}$
α
φ
plays the key role. Our studies are conducted in a full possible generality.
Publisher
Springer Science and Business Media LLC
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