The partially ordered sets of measure theory and Tukey's ordering

Authors

  • D.H. Fremlin

DOI:

https://doi.org/10.1285/i15900932v11p177

Abstract

In [28], J.W. Tukey introduced an ordering on the class of directed sets, designed to illuminate the theory of Moore-Smith convergence. I show how variations of his idea can be used to give information on a wide variety of partially ordered sets arising in measure theory.

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Published

01-01-1991

Issue

Volume 11 (1991)

Section

Articoli

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