Adhesive categories, and variants such as M, N-adhesive ones, marked a watershed moment for the algebraic approaches to the rewriting of graph-like structures, since they provide an abstract framework where many general results (on e.g. parallelism) could be recast and uniformly proved. However, often checking that a model satisfies the adhesivity properties is far from immediate. In this paper we present a new criterion giving a sufficient condition for M, N-adhesivity, a generalisation of the original notion of adhesivity. To show the effectiveness of this criterion, we apply it to several existing categories of graph-like structures, including hypergraphs, various kinds of hierarchical graphs (a formalism that is notoriously difficult to fit in the mould of algebraic approaches to rewriting), and combinations of them.
A simple criterion for M,N-adhesivity
Gadducci, FabioCo-primo
Membro del Collaboration Group
;Miculan, MarinoCo-primo
Membro del Collaboration Group
2024-01-01
Abstract
Adhesive categories, and variants such as M, N-adhesive ones, marked a watershed moment for the algebraic approaches to the rewriting of graph-like structures, since they provide an abstract framework where many general results (on e.g. parallelism) could be recast and uniformly proved. However, often checking that a model satisfies the adhesivity properties is far from immediate. In this paper we present a new criterion giving a sufficient condition for M, N-adhesivity, a generalisation of the original notion of adhesivity. To show the effectiveness of this criterion, we apply it to several existing categories of graph-like structures, including hypergraphs, various kinds of hierarchical graphs (a formalism that is notoriously difficult to fit in the mould of algebraic approaches to rewriting), and combinations of them.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.