Two constructions of gamma spaces
Seminar
Speaker
Jialiang He (BIU)
Date
04/03/2019 - 15:00 - 13:00Add to Calendar
2019-03-04 13:00:00
2019-03-04 15:00:00
Two constructions of gamma spaces
An infinite cover of a topological space is an w-cover if every finite subset of this space is contained in some member of the cover, and the whole space is not a member the cover. A cover of a topological space is a gamma-cover if every point of this space belongs to all but finitely many members of this cover. A gamma-space is a space in which every open w-cover contains a gamma-cover.
In this talk, we will present the details how to construct it.
Building 105, Room 61
אוניברסיטת בר-אילן - Department of Mathematics
mathoffice@math.biu.ac.il
Asia/Jerusalem
public
Place
Building 105, Room 61
Abstract
An infinite cover of a topological space is an w-cover if every finite subset of this space is contained in some member of the cover, and the whole space is not a member the cover. A cover of a topological space is a gamma-cover if every point of this space belongs to all but finitely many members of this cover. A gamma-space is a space in which every open w-cover contains a gamma-cover.
In this talk, we will present the details how to construct it.
Last Updated Date : 06/03/2019
