Operator-valued measures and integrals for cone-valued functions

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Integration theory deals with extended real-valued, vector-valued, or operator-valued measures and functions. Different approaches are applied in each of these cases using different techniques. The order structure of the (extended) real number system is used for real-valued functions and measures, whereas suprema and infima are replaced with topological limits in the vector-valued case.

A novel approach employing more general structures, locally convex cones, which are natural generalizations of locally convex vector spaces, is introduced here. This setting allows developing a general theory of integration which simultaneously deals with all of the above-mentioned cases.

Author(s): Walter Roth (auth.)
Series: Lecture notes in mathematics 1964
Edition: 1
Publisher: Springer-Verlag Berlin Heidelberg
Year: 2009

Language: English
Pages: 356
City: [Berlin]
Tags: Measure and Integration; Functional Analysis

Front Matter....Pages i-x
Introduction....Pages 1-7
Locally Convex Cones....Pages 9-117
Measures and Integrals. The General Theory....Pages 119-248
Measures on Locally Compact Spaces....Pages 249-340
Back Matter....Pages 341-362