AbstractIn category theory, most set-theoretic constructions–union, intersection, etc.–have direct categorical counterparts. But up to now, there is no direct construction of a deletion operation like the set-theoretic complement. In rule-based transformation systems, deletion of parts of a given object is one of the main tasks. In the double pushout approach to algebraic graph transformation, the construction of pushout complements is used in order to locally delete structures from graphs. But in general categories, even if they have pushouts, pushout complements do not necessarily exist or are unique. In this paper, two different constructions for pushout complements are given and compared. Both constructions are based on certain universa...
AbstractParallel and distributed derivations are introduced and studied in the single-pushout approa...
AbstractIn 1984, Raoult has given a description of graph rewriting. His description is operational, ...
The transformation of total graph structures has been studied from the algebraic point of view over ...
AbstractIn category theory, most set-theoretic constructions–union, intersection, etc.–have direct c...
Abstract: We describe a concrete construction of all pushout complements for two given morphisms f: ...
AbstractThe single-pushout approach to graph transformation interprets a double-pushout transformati...
AbstractDouble pushout (algebraic) graph rewriting, which works by first removing the part of the gr...
The algebraic approaches to graph transformation are based on the concept of gluing of graphs, mode...
We describe a concrete construction of all pushout complements for two given morphisms f : A -> B, m...
Abstract. We describe a concrete construction of all pushout complements for two given morphisms f :...
The algebraic approaches to graph transformation are based on the concept of gluing of graphs, mode...
The elegance of the single-pushout (SPO) approach to graph transformations arises from substituting ...
AbstractAn existence theorem of pushout-complements is given in an elementary topos by using categor...
The algebraic graph transformation approach originates in the so-called double pushout approach. The...
AbstractThe transformation of total graph structures has been studied from the algebraic point of vi...
AbstractParallel and distributed derivations are introduced and studied in the single-pushout approa...
AbstractIn 1984, Raoult has given a description of graph rewriting. His description is operational, ...
The transformation of total graph structures has been studied from the algebraic point of view over ...
AbstractIn category theory, most set-theoretic constructions–union, intersection, etc.–have direct c...
Abstract: We describe a concrete construction of all pushout complements for two given morphisms f: ...
AbstractThe single-pushout approach to graph transformation interprets a double-pushout transformati...
AbstractDouble pushout (algebraic) graph rewriting, which works by first removing the part of the gr...
The algebraic approaches to graph transformation are based on the concept of gluing of graphs, mode...
We describe a concrete construction of all pushout complements for two given morphisms f : A -> B, m...
Abstract. We describe a concrete construction of all pushout complements for two given morphisms f :...
The algebraic approaches to graph transformation are based on the concept of gluing of graphs, mode...
The elegance of the single-pushout (SPO) approach to graph transformations arises from substituting ...
AbstractAn existence theorem of pushout-complements is given in an elementary topos by using categor...
The algebraic graph transformation approach originates in the so-called double pushout approach. The...
AbstractThe transformation of total graph structures has been studied from the algebraic point of vi...
AbstractParallel and distributed derivations are introduced and studied in the single-pushout approa...
AbstractIn 1984, Raoult has given a description of graph rewriting. His description is operational, ...
The transformation of total graph structures has been studied from the algebraic point of view over ...