A generalised mid summability in Banach spaces

Abstract

In this paper, we study the notion of mid summability in a general setting using the duality theory of sequence spaces. We define the vector valued sequence space λmid(X) corresponding to a Banach space X and sequence space λ. We prove that λmid(·) can be placed in a chain with the vector valued sequence spaces λs(·) and λw(·). Consequently, we define mid λ-summing operators and obtain the maximality of these operator ideals for a suitably restricted λ. Furthermore, we define a tensor norm using the vector valued sequence spaces λs(·) and λmid(·), and establish its correspondence with the operator ideal of absolutely mid λ-summing operators.

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