Add to ORKGInternational audienceThis paper answers positively a question of Pfister by proving that every Čech-complete semitopological group (that is, a group with a separately continuous multiplication) is a topological group. In fact, a bit more is proved: every Čech-analytic Baire semitopological group is a topological group. The same result for locally compact groups is known as Ellis's theorem (1957)
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
International audienceThis paper answers positively a question of Pfister by proving that every Čech...
AbstractA semitopological group (topological group) is a group endowed with a topology for which mul...
Abstract. A semitopological group (topological group) is a group endowed with a topology for which m...
AbstractVarious theorems which are valid in the presence of metrizability or compactness can be gene...
International audienceVarious theorems which are valid in the presence of metrizability or compactne...
International audienceVarious theorems which are valid in the presence of metrizability or compactne...
A semitopological group (topological group) is a group endowed with a topology for which multiplicat...
Abstract. A semitopological group (topological group) is a group endowed with a topology for which m...
AbstractSeveral new facts concerning topologies of paratopological and semitopological groups are es...
AbstractA semitopological group (topological group) is a group endowed with a topology for which mul...
This thesis is a study of semitopological groups, a similar but weaker notion than that of topologic...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
International audienceThis paper answers positively a question of Pfister by proving that every Čech...
AbstractA semitopological group (topological group) is a group endowed with a topology for which mul...
Abstract. A semitopological group (topological group) is a group endowed with a topology for which m...
AbstractVarious theorems which are valid in the presence of metrizability or compactness can be gene...
International audienceVarious theorems which are valid in the presence of metrizability or compactne...
International audienceVarious theorems which are valid in the presence of metrizability or compactne...
A semitopological group (topological group) is a group endowed with a topology for which multiplicat...
Abstract. A semitopological group (topological group) is a group endowed with a topology for which m...
AbstractSeveral new facts concerning topologies of paratopological and semitopological groups are es...
AbstractA semitopological group (topological group) is a group endowed with a topology for which mul...
This thesis is a study of semitopological groups, a similar but weaker notion than that of topologic...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...
It is proved that every remainder of a non-locally compact semitopological group $G$ is a Baire spac...