DOIAbstract
AbstractBy extracting the lattice theoretic content we see that the universal compact representation of a ring is canonically determined by the regular core of its lattice of two-sided ideals
AbstractBy extracting the lattice theoretic content we see that the universal compact representation of a ring is canonically determined by the regular core of its lattice of two-sided ideals
AbstractLet X be a completely regular Hausdorff space, C(X) the ring of real-valued continuous funct...
AbstractThere is a model of set theory in which all compact spaces of weight at most ω2 are pseudora...
<P>Let C(X) be the ring of all continuous real valued functions defined on a completely regu...
AbstractBy extracting the lattice theoretic content we see that the universal compact representation...
AbstractThis paper shows that the compact completely regular coreflection in the category of frames ...
compact regular locales, or of compact completely regular locales) by means of sublattices of the la...
If two compact Hausdorff spaces have elementarily equivalent lattices of closed sets, then their uni...
We present two theorems which can be used to represent compact connected Hausdorff spaces in an alge...
We prove the following result: Theorem. Every algebraic distributive lattice D with at most N1 compa...
summary:Let $X$ be a completely regular Hausdorff space and, as usual, let $C(X)$ denote the ring of...
This paper shows that the compact regular locales on the one hand, and the compact completely regula...
summary:We define ``the category of compactifications'', which is denoted {\bf{CM}}, and consider it...
Abstract. Many properties of compacta have “textbook ” definitions which are phrased in lattice-theo...
AbstractThis note presents a general construction connecting compact locales and distributive lattic...
summary:A space $X$ is called $\mu $-compact by M. Mandelker if the intersection of all free maximal...
AbstractLet X be a completely regular Hausdorff space, C(X) the ring of real-valued continuous funct...
AbstractThere is a model of set theory in which all compact spaces of weight at most ω2 are pseudora...
<P>Let C(X) be the ring of all continuous real valued functions defined on a completely regu...
AbstractBy extracting the lattice theoretic content we see that the universal compact representation...
AbstractThis paper shows that the compact completely regular coreflection in the category of frames ...
compact regular locales, or of compact completely regular locales) by means of sublattices of the la...
If two compact Hausdorff spaces have elementarily equivalent lattices of closed sets, then their uni...
We present two theorems which can be used to represent compact connected Hausdorff spaces in an alge...
We prove the following result: Theorem. Every algebraic distributive lattice D with at most N1 compa...
summary:Let $X$ be a completely regular Hausdorff space and, as usual, let $C(X)$ denote the ring of...
This paper shows that the compact regular locales on the one hand, and the compact completely regula...
summary:We define ``the category of compactifications'', which is denoted {\bf{CM}}, and consider it...
Abstract. Many properties of compacta have “textbook ” definitions which are phrased in lattice-theo...
AbstractThis note presents a general construction connecting compact locales and distributive lattic...
summary:A space $X$ is called $\mu $-compact by M. Mandelker if the intersection of all free maximal...
AbstractLet X be a completely regular Hausdorff space, C(X) the ring of real-valued continuous funct...
AbstractThere is a model of set theory in which all compact spaces of weight at most ω2 are pseudora...
<P>Let C(X) be the ring of all continuous real valued functions defined on a completely regu...
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