Lipschitz $p$-summing multilinear operators
We apply the geometric approach provided by $\Sigma$-operators to develop a theory of $p$-summability for multilinear operators. In this way, we introduce the notion of Lipschitz $p$-summing multilinear operators and show that it is consistent with a general panorama of generalization: Namely, they...
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| Main Authors | , |
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| Format | Journal Article |
| Language | English |
| Published |
05.05.2018
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| Subjects | |
| Online Access | Get full text |
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| Summary: | We apply the geometric approach provided by $\Sigma$-operators to develop a
theory of $p$-summability for multilinear operators. In this way, we introduce
the notion of Lipschitz $p$-summing multilinear operators and show that it is
consistent with a general panorama of generalization: Namely, they satisfy
Pietsch-type domination and factorization theorems and generalizations of the
inclusion Theorem, Grothendieck's coincidence Theorems, the weak
Dvoretsky-Rogers Theorem and a Lindenstrauss-Pelczy\'nsky Theorem. We also
characterize this new class in tensorial terms by means of a Chevet-Saphar-type
tensor norm. Moreover, we introduce the notion of Dunford-Pettis multilinear
operators. With them, we characterize when a projective tensor product contains
$\ell_1$. Relations between Lipschitz $p$-summing multilinear operators with
Dunford-Pettis and Hilbert-Schmidt multilinear operators are given. |
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| DOI: | 10.48550/arxiv.1805.02115 |