Adhesive high-level replacement (HLR) systems are introduced as a new categorical framework for graph transformation in the double pushout (DPO) approach, which combines the well-known concept of HLR systems with the new concept of adhesive categories introduced by Lack and Sobociński. In this paper we show that most of the HLR properties, which had been introduced to generalize some basic results from the category of graphs to high-level structures, are valid already in adhesive HLR categories. This leads to a smooth categorical theory of HLR systems which can be applied to a large variety of graphs and other visual models. As a main new result in a categorical framework we show the Critical Pair Lemma for the local confluence of transfor...
AbstractThe recent interest in bisimulation congruences for reduction systems, stimulated by the res...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Abstract. Amalgamation is a well-known concept for graph transfor-mations in order to model synchron...
Adhesive high-level replacement (HLR) categories and systems are introduced as a new categorical fra...
Several variants of high-level replacement (HLR) and adhesive categories have been introduced in the...
Several variants of high-level replacement (HLR) and adhesive cate-gories have been introduced in th...
Adhesive high-level replacement (HLR) systems have been recently introduced as a new categorical fra...
Several variants of high-level replacement (HLR) and adhesive cate-gories have been introduced in th...
Abstract. In this paper we introduce the categorical framework for rule-based transformations of hig...
formation, EATCS Monographs, Springer, 2006), adhesive high-level replacement (HLR) categories and s...
Abstract: Adhesive high-level replacement (HLR) systems have been recently introduced as a new categ...
Adhesive high-level replacement (HLR) systems have been recently established as a suitable categoric...
AbstractAdhesive high-level replacement (HLR) systems have been recently established as a suitable c...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive categories provide an abstract setting for the double-pushout approach to rewriting, genera...
AbstractThe recent interest in bisimulation congruences for reduction systems, stimulated by the res...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Abstract. Amalgamation is a well-known concept for graph transfor-mations in order to model synchron...
Adhesive high-level replacement (HLR) categories and systems are introduced as a new categorical fra...
Several variants of high-level replacement (HLR) and adhesive categories have been introduced in the...
Several variants of high-level replacement (HLR) and adhesive cate-gories have been introduced in th...
Adhesive high-level replacement (HLR) systems have been recently introduced as a new categorical fra...
Several variants of high-level replacement (HLR) and adhesive cate-gories have been introduced in th...
Abstract. In this paper we introduce the categorical framework for rule-based transformations of hig...
formation, EATCS Monographs, Springer, 2006), adhesive high-level replacement (HLR) categories and s...
Abstract: Adhesive high-level replacement (HLR) systems have been recently introduced as a new categ...
Adhesive high-level replacement (HLR) systems have been recently established as a suitable categoric...
AbstractAdhesive high-level replacement (HLR) systems have been recently established as a suitable c...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive categories provide an abstract setting for the double-pushout approach to rewriting, genera...
AbstractThe recent interest in bisimulation congruences for reduction systems, stimulated by the res...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Abstract. Amalgamation is a well-known concept for graph transfor-mations in order to model synchron...