Order convergence and convergence almost everywhere revisited

Preuß, Gerhard

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Publication date

January 2010

DOI

10.17169/refubium-21732

Abstract

In Analysis two modes of non-topological convergence are interesting: order convergence and convergence almost everywhere. It is proved here that oder convergence of sequences can be induced by a limit structure, even a finest one, whenever it is considered in sigma-distributive lattices. Since convergence almost everywhere can be regarded as order convergence in a certain sigma-distributive lattice, this result can be applied to convergence of sequences almost everywhere and thus generalizing a former result of U. Höhle obtained in a more indirect way by using fuzzy topologies

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Order convergence and convergence almost everywhere revisited

Abstract

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Order convergence and convergence almost everywhere revisited

Abstract

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