Most graph query languages are rooted in logic. By contrast, in this paper we consider graph query languages rooted in linear algebra. More specifically, we consider MATLANG, a matrix query language recently introduced, in which some basic linear algebra functionality is supported. We investigate the problem of characterising equivalence of graphs, represented by their adjacency matrices, for various fragments of MATLANG. A complete picture is painted of the impact of the linear algebra operations in MATLANG on their ability to distinguish graphs
Motivated by both established and new applications, we study navigational query languages for graphs...
Several established and novel applications motivate us to study the expressive power of navigational...
This paper introduces combinatorial representations, which generalise the notion of linear represent...
We investigate when two graphs, represented by their adjacency matrices, can be distinguished by mea...
We investigate the expressive power of MATLANG, a formal language for matrix manipulation based on c...
Several established and novel applications motivate us to study the expressive power of navigational...
Motivated by both established and new applications, we study navigational query languages for graphs...
Motivated by both established and new applications, we study navigational query languages for graphs...
This new edition illustrates the power of linear algebra in the study of graphs. The emphasis on mat...
We consider the general problem of learning about a matrix through vector-matrix-vector queries. The...
The study aims to exhibit a relationship between Graph Theory and Linear Algebra by proving some wel...
Motivated by both established and new applications, we study navi-gational query languages for graph...
Several established and novel applications motivate us to study the expressive power of navigational...
A proof whether two graphs (possibly oriented graphs or multigraphs, etc.) are isomorphic or not can...
Several established and novel applications motivate us to study the expressive power of navigational...
Motivated by both established and new applications, we study navigational query languages for graphs...
Several established and novel applications motivate us to study the expressive power of navigational...
This paper introduces combinatorial representations, which generalise the notion of linear represent...
We investigate when two graphs, represented by their adjacency matrices, can be distinguished by mea...
We investigate the expressive power of MATLANG, a formal language for matrix manipulation based on c...
Several established and novel applications motivate us to study the expressive power of navigational...
Motivated by both established and new applications, we study navigational query languages for graphs...
Motivated by both established and new applications, we study navigational query languages for graphs...
This new edition illustrates the power of linear algebra in the study of graphs. The emphasis on mat...
We consider the general problem of learning about a matrix through vector-matrix-vector queries. The...
The study aims to exhibit a relationship between Graph Theory and Linear Algebra by proving some wel...
Motivated by both established and new applications, we study navi-gational query languages for graph...
Several established and novel applications motivate us to study the expressive power of navigational...
A proof whether two graphs (possibly oriented graphs or multigraphs, etc.) are isomorphic or not can...
Several established and novel applications motivate us to study the expressive power of navigational...
Motivated by both established and new applications, we study navigational query languages for graphs...
Several established and novel applications motivate us to study the expressive power of navigational...
This paper introduces combinatorial representations, which generalise the notion of linear represent...