locally truly weakly pseudocompact

Definition

A space X is locally truly weakly pseudocompact at a point x in X if there is a basic system of open neighborhoods N of x whose all of elements are truly weakly pseudocompact. If X is locally truly weakly pseudocompact at every point, X is simply called locally truly weakly pseudocompact.

Reference

O. Okunev, A. Tamariz-Mascarua, Generalized linearly ordered spaces and weak pseudocompactness, Comment.Math.Univ.Carolin. 38,4 (1997)775–790.