weakly monocompact (measure)

Last-modified: 2010-10-30 (土) 06:50:38

Definition

  • Let (X,S,m) be a measure space. Then m is said to be weakly monocompact, if there exist a monocompact family K with the following property; for every E in S with nonzero m-measure, there is F in S with nonzero m-measure and element in K which contains F and contained in E.

Remark

Reference