Add to ORKGWe study links between faithful group actions on a set and topologies on that set. In one direction, a group action has its invariant topologies (so we may regard members of the action to be homeomorphisms relative to those topologies); in the other direction, a topology has its preserving group actions (i.e., the subgroups of the homeomorphism group of the topology). This two-way passage allows us to discuss topological features of group actions as well as symmetry features of topologies
We introduce some canonical topologies induced by actions of topological groups on groups and rings....
Includes bibliographical references (page 87)This work aims to survey topological groups and explore...
Topological data analysis is a new approach to processing digital data, focusing on the fact that to...
We study links between faithful group actions on a set and topologies on that set. In one direction,...
We study links between faithful group actions on a set and topologies on that set. In one direction,...
AbstractWe study links between faithful group actions on a set and topologies on that set. In one di...
AbstractWe study links between faithful group actions on a set and topologies on that set. In one di...
Part 1: MAKE TopologyInternational audienceTopological data analysis is a new approach to processing...
Part 1: MAKE TopologyInternational audienceTopological data analysis is a new approach to processing...
The continuity assumption was not necessaryInternational audienceIn this article, we describe all th...
The continuity assumption was not necessaryInternational audienceIn this article, we describe all th...
Abstract. This article provides a brief sketch of the theory of ¯nite group actions studied in terms...
Let G be a group and H a proper subgroup of G. If H is a topological group, a natural question to as...
The continuity assumption was not necessaryInternational audienceIn this article, we describe all th...
Let G be a group and H a proper subgroup of G. If H is a topological group, a natural question to as...
We introduce some canonical topologies induced by actions of topological groups on groups and rings....
Includes bibliographical references (page 87)This work aims to survey topological groups and explore...
Topological data analysis is a new approach to processing digital data, focusing on the fact that to...
We study links between faithful group actions on a set and topologies on that set. In one direction,...
We study links between faithful group actions on a set and topologies on that set. In one direction,...
AbstractWe study links between faithful group actions on a set and topologies on that set. In one di...
AbstractWe study links between faithful group actions on a set and topologies on that set. In one di...
Part 1: MAKE TopologyInternational audienceTopological data analysis is a new approach to processing...
Part 1: MAKE TopologyInternational audienceTopological data analysis is a new approach to processing...
The continuity assumption was not necessaryInternational audienceIn this article, we describe all th...
The continuity assumption was not necessaryInternational audienceIn this article, we describe all th...
Abstract. This article provides a brief sketch of the theory of ¯nite group actions studied in terms...
Let G be a group and H a proper subgroup of G. If H is a topological group, a natural question to as...
The continuity assumption was not necessaryInternational audienceIn this article, we describe all th...
Let G be a group and H a proper subgroup of G. If H is a topological group, a natural question to as...
We introduce some canonical topologies induced by actions of topological groups on groups and rings....
Includes bibliographical references (page 87)This work aims to survey topological groups and explore...
Topological data analysis is a new approach to processing digital data, focusing on the fact that to...