Products of completion regular measures

Volume 147 / 1995

D. H. Fremlin, S. Grekas Fundamenta Mathematicae 147 (1995), 27-37 DOI: 10.4064/fm-147-1-27-37

Abstract

We investigate the products of topological measure spaces, discussing conditions under which all open sets will be measurable for the simple completed product measure, and under which the product of completion regular measures will be completion regular. In passing, we describe a new class of spaces on which all completion regular Borel probability measures are τ-additive, and which have other interesting properties.

Authors

  • D. H. Fremlin
  • S. Grekas

Search for IMPAN publications

Query phrase too short. Type at least 4 characters.

Rewrite code from the image

Reload image

Reload image