AbstractThe variety of power domain constructions proposed in the literature is put into a general algebraic framework. Power constructions are considered algebras on a higher level: for every ground domain, there is a power domain whose algebraic structure is specified by means of axioms concerning the algebraic properties of the basic operations empty set, union, singleton, and extension of functions. A host of derived operations is introduced and investigated algebraically. Every power construction is shown to be equipped with a characteristic semiring such that the resulting power domains become semiring modules. Power homomorphisms are introduced as a means to relate different power constructions. They also allow to define the notion o...
In the context of standard abstract interpretation theory, a reduced relative power operation for fu...
The initial lower and upper power domain constructions P and P commute under composition for all c...
AbstractWe introduce a framework for the study of formal contexts and their lattices induced by the ...
The variety of power domain constructions proposed in the literature is put into a general algebraic...
The variety of power domain constructions proposed in the literature is put into a general algebraic...
AbstractThe variety of power domain constructions proposed in the literature is put into a general a...
AbstractIn the category of stable dcpo's, free constructions w.r.t. algebraic theories exist. From t...
Several equivalent approaches to power domains are presented: the naturality of this concept for den...
AbstractLower, upper, sandwich, mixed, and convex power domains are isomorphic to domains of second-...
In this paper we design abstract domains for power analysis. These domains are conceived to discover...
The class of countably based bifinites (SFP objects) is the usual mathematical framework for carryi...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
AbstractIn the context of standard abstract interpretation theory, a reduced relative power operatio...
AbstractWe introduce the concept of polynomial operation from the Burnside ring functor A to other r...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
In the context of standard abstract interpretation theory, a reduced relative power operation for fu...
The initial lower and upper power domain constructions P and P commute under composition for all c...
AbstractWe introduce a framework for the study of formal contexts and their lattices induced by the ...
The variety of power domain constructions proposed in the literature is put into a general algebraic...
The variety of power domain constructions proposed in the literature is put into a general algebraic...
AbstractThe variety of power domain constructions proposed in the literature is put into a general a...
AbstractIn the category of stable dcpo's, free constructions w.r.t. algebraic theories exist. From t...
Several equivalent approaches to power domains are presented: the naturality of this concept for den...
AbstractLower, upper, sandwich, mixed, and convex power domains are isomorphic to domains of second-...
In this paper we design abstract domains for power analysis. These domains are conceived to discover...
The class of countably based bifinites (SFP objects) is the usual mathematical framework for carryi...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
AbstractIn the context of standard abstract interpretation theory, a reduced relative power operatio...
AbstractWe introduce the concept of polynomial operation from the Burnside ring functor A to other r...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
In the context of standard abstract interpretation theory, a reduced relative power operation for fu...
The initial lower and upper power domain constructions P and P commute under composition for all c...
AbstractWe introduce a framework for the study of formal contexts and their lattices induced by the ...