مرکز منطقه ای اطلاع رساني علوم و فناوري - Continuity of separately continuous group actions in p-spaces

Title of article :

Continuity of separately continuous group actions in p-spaces

Author/Authors :

Ahmed Ait-Bouziad، نويسنده , , Ahmed، نويسنده ,

Issue Information :

دوماهنامه با شماره پیاپی سال 1996

Pages :

From page :

119

To page :

124

Abstract :

Let ƒ:X × Y → Z be a separately continuous mapping, where X is a Baire p-space and Z a completely regular space, and let y ϵ Y be a q-point. We show that 1. s strongly quasicontinuous at each point of X × {y}, f Z is a p-space, then ƒ is subcontinuous at each point of A × {y}, where A is a dense subset of X. Then, we use (i) and (ii) to prove that every separately continuous action of a left topological group, which is a Baire p-space, in a p-space, is a continuous action. In particular, every semitopological group, which is a Baire p-space, has a continuous multiplication.

Keywords :

q-space , Semitopological group , Separate continuity , Group action , Subcontinuity , P-space , Strong quasicontinuity

Journal title :

Topology and its Applications

Serial Year :

1996

Journal title :

Topology and its Applications

Record number :

1578882

Link To Document :

https://search.isc.ac/dl/search/defaultta.aspx?DTC=10&DC=1578882