Add to ORKGAbstract. Compactifications of biframes are defined, and characterized internally by means of strong inclusions. The existing description of the compact, zero-dimensional coreflection of a biframe is used to characterize all zero-dimensional compactifications, and a criterion identifying them by their strong inclusions is given. In contrast to the above, two sufficient conditions and several examples show that the existence of smallest biframe compactifica-tions differs significantly from the corresponding frame question
The compact extension property: the role of compactness Jos van der Bijl∗, Jan van Mill Abstract. We...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
summary:Compactifications of biframes are defined, and characterized internally by means of strong i...
Abstract. We investigate notions of N-compactness for frames. We find that the analogues of equivale...
summary:Compactifications of biframes are defined, and characterized internally by means of strong i...
summary:We investigate notions of $\Bbb N$-compactness for frames. We find that the analogues of equ...
Abstract. We generalize the concept of a strong inclusion on a biframe [Sch93] to that of a proximit...
summary:We characterize those regular continuous frames for which the least compactification is a pe...
summary:Perfect compactifications of frames are introduced. It is shown that the Stone-Čech compacti...
summary:Perfect compactifications of frames are introduced. It is shown that the Stone-Čech compacti...
summary:Perfect compactifications of frames are introduced. It is shown that the Stone-Čech compacti...
summary:We investigate notions of $\Bbb N$-compactness for frames. We find that the analogues of equ...
summary:We investigate notions of $\Bbb N$-compactness for frames. We find that the analogues of equ...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
The compact extension property: the role of compactness Jos van der Bijl∗, Jan van Mill Abstract. We...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
summary:Compactifications of biframes are defined, and characterized internally by means of strong i...
Abstract. We investigate notions of N-compactness for frames. We find that the analogues of equivale...
summary:Compactifications of biframes are defined, and characterized internally by means of strong i...
summary:We investigate notions of $\Bbb N$-compactness for frames. We find that the analogues of equ...
Abstract. We generalize the concept of a strong inclusion on a biframe [Sch93] to that of a proximit...
summary:We characterize those regular continuous frames for which the least compactification is a pe...
summary:Perfect compactifications of frames are introduced. It is shown that the Stone-Čech compacti...
summary:Perfect compactifications of frames are introduced. It is shown that the Stone-Čech compacti...
summary:Perfect compactifications of frames are introduced. It is shown that the Stone-Čech compacti...
summary:We investigate notions of $\Bbb N$-compactness for frames. We find that the analogues of equ...
summary:We investigate notions of $\Bbb N$-compactness for frames. We find that the analogues of equ...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
The compact extension property: the role of compactness Jos van der Bijl∗, Jan van Mill Abstract. We...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...
summary:A bijective correspondence between strong inclusions and compactifications in the setting of...