A Localic Theory of Lower and Upper Integrals

Steven Vickers

doi:10.1002/malq.200710028

A Localic Theory of Lower and Upper Integrals

Steven Vickers

Computer Science

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Abstract

An account of lower and upper integration is given. It is constructive in the sense of geometric logic. If the integrand takes its values in the non-negative lower reals, then its lower integral with respect to a valuation is a lower real. If the integrand takes its values in the non-negative upper reals,then its upper integral with respect to a covaluation and with domain of integration bounded by a compact subspace is an upper real. Spaces of valuations and of covaluations are defined. Riemann and Choquet integrals can be calculated in terms of these lower and upper integrals.

Original language	English
Pages (from-to)	109-123
Number of pages	15
Journal	Mathematical Logic Quarterly
Volume	54
Issue number	1
DOIs	https://doi.org/10.1002/malq.200710028
Publication status	Published - 1 Feb 2008

Keywords

Choquet integral
valuation
Riemann integral
locale
geometric logic

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10.1002/malq.200710028

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http://www3.interscience.wiley.com/journal/117902848/abstract

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AB - An account of lower and upper integration is given. It is constructive in the sense of geometric logic. If the integrand takes its values in the non-negative lower reals, then its lower integral with respect to a valuation is a lower real. If the integrand takes its values in the non-negative upper reals,then its upper integral with respect to a covaluation and with domain of integration bounded by a compact subspace is an upper real. Spaces of valuations and of covaluations are defined. Riemann and Choquet integrals can be calculated in terms of these lower and upper integrals.

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KW - valuation

KW - Riemann integral

KW - locale

KW - geometric logic

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DO - 10.1002/malq.200710028

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A Localic Theory of Lower and Upper Integrals

Abstract

Keywords

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