Integral Representations for Continuous Linear Functionals in Operator-Initiated Topologies |
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Authors: | Roth Walter |
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Affiliation: | (1) Department of Mathematics, Universiti Brunei Darussalam, Gadong BE, 1410, Brunei Darussalam |
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Abstract: | On a given cone (resp. vector space) we consider an initial topology and order induced by a family of linear operators into a second cone which carries a locally convex topology. We prove that monotone linear functionals on which are continuous with respect to this initial topology may be represented as certain integrals of continuous linear functionals on . Based on the Riesz representation theorem from measure theory, we derive an integral version of the Jordan decomposition for linear functionals on ordered vector spaces. |
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Keywords: | locally convex cones positive linear functionals |
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