Lipschitz \(p\)-lattice summing operators (Q2232304)
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| Language | Label | Description | Also known as |
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| English | Lipschitz \(p\)-lattice summing operators |
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Lipschitz \(p\)-lattice summing operators (English)
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4 October 2021
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The authors define the concept of Lipschitz \(p\)-lattice summing operators as a natural generalization of the concept of \(p\)-lattice summing linear operators. The Lipschitz \(p\)-lattice summing operators satisfies the left ideal property, thus this class is not an ideal in the sense of \textit{D.~Achour} et al. [J. Math. Anal. Appl. 436, No.~1, 217--236 (2016; Zbl 1409.47003)]. Moreover, these mappings do not satisfy the linearization theorem. Also, some connections with other classes of Lipschitz operators are presented.
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Lipschitz $p$-summing operators
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$p$-lattice summing operators
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concave operators
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convex operators
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order bounded operators
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