Joint Continuity and Quasicontinuity of Horizontally Quasicontinuous Mappings

  • V. K. Maslyuchenko
  • V. V. Nesterenko

Abstract

We show that if Xis a topological space, Ysatisfies the second axiom of countability, and Zis a metrizable space, then, for every mapping f: X× YZthat is horizontally quasicontinuous and continuous in the second variable, a set of points xXsuch that fis continuous at every point from {x} × Yis residual in X. We also generalize a result of Martin concerning the quasicontinuity of separately quasicontinuous mappings.
Published
25.12.2000
How to Cite
MaslyuchenkoV. K., and NesterenkoV. V. “Joint Continuity and Quasicontinuity of Horizontally Quasicontinuous Mappings”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 52, no. 12, Dec. 2000, pp. 1711-4, https://umj.imath.kiev.ua/index.php/umj/article/view/4575.
Section
Short communications