Conical decomposition and vector lattices with respect to several preorders

Title: Conical decomposition and vector lattices with respect to several preorders
Creator: Baratov, Rishat; Rubinov, Alex
Date: 2006
Type: Text; Journal article
Identifier: http://researchonline.federation.edu.au/vital/access/HandleResolver/1959.17/64843
Identifier: vital:97
Identifier: ISSN:1027-5487
Abstract: The decomposition set-valued mapping in a Banach space E with cones K i,i = 1,..., n describes all decompositions of a given element on addends, such that addend i belongs to the i-th cone. We examine the decomposition mapping and its dual. We study conditions that provide the additivity of the decomposition mapping. For this purpose we introduce and study the Riesz interpolation property and lattice properties of spaces with respect to several preorders. The notion of 2-vector lattice is introduced and studied. Theorems that establish the relationship between the Riesz interpolation property and lattice properties of the dual spaces are given.; C1
Publisher: Mathematical Society of the Republic of China
Relation: Taiwanese Journal of Mathematics Vol. 10, no. 2 (2006), p. 265-298
Rights: Open Access
Rights: Copyright Mathematical Society of the Republic of China
Rights: This metadata is freely available under a CCO license
Subject: 0101 Pure Mathematics; Decomposition mapping; Riesz decomposition property; Riesz interpolation property; Vector lattices respect to several preorders
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