Extensions of the Hilbert-multi-norm in Hilbert C*-modules

Abstract

Dales and Polyakov introduced a multi-norm ( \|·\|n(2,2):n∈N) based on a Banach space X and showed that it is equal with the Hilbert-multi-norm ( \|·\|nH:n∈N) based on an infinite-dimensional Hilbert space H. We enrich the theory and present three extensions of the Hilbert-multi-norm for a Hilbert C*-module X. We denote these multi-norms by ( \|·\|nX:n∈N), ( \|·\|n*:n∈N), and ( \|·\|nP(A ) :n∈N). We show that \|x\|nP(A ) ≥\|x\|nX≤ \|x\|n* for each x∈Xn. In the case when X is a Hilbert K(H)-module, for each x∈Xn, we observe that \|·\|nP(A )=\|·\|nX. Furthermore, if H is separable and X is infinite-dimensional, we prove that \|x\|nX=\|x\|n*. Among other things, we show that small and orthogonal decompositions with respect to these multi-norms are equivalent. Several examples are given to support the new findings.

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