We investigate when two graphs, represented by their adjacency matrices, can be distinguished by means of sentences formed in MATLANG, a matrix query language which supports a number of elementary linear algebra operators. When undirected graphs are concerned, and hence the adjacency matrices are real and symmetric, precise characterisations are in place when two graphs (i.e., their adjacency matrices) can be distinguished. Turning to directed graphs, one has to deal with asymmetric adjacency matrices. This complicates matters. Indeed, it requires to understand the more general problem of when two arbitrary matrices can be distinguished in MATLANG. We provide characterisations of the distinguishing power of MATLANG on real and complex matri...
For a directed or undirected graph without loops we give formulae for the determinant and adjugate o...
Several established and novel applications motivate us to study the expressive power of navigational...
What part does algebra play in representing the real world abstractly? How can algebra be used to so...
Most graph query languages are rooted in logic. By contrast, in this paper we consider graph query l...
We investigate the expressive power of MATLANG, a formal language for matrix manipulation based on c...
The present article is designed to be a contribution to the chapter `Combinatorial Matrix Theory and...
We consider algorithms with access to an unknown matrix M in F^{n x d} via matrix-vector products, n...
We consider the general problem of learning about a matrix through vector-matrix-vector queries. The...
For almost all graphs the answer to the question in the title is still unknown. Here we survey the c...
In the context of the stability analysis of interdependent networks through the eigenvalue evaluatio...
In this article we establish relationships between Leavitt path algebras, talented monoids and the a...
This new edition illustrates the power of linear algebra in the study of graphs. The emphasis on mat...
Linear algebra and matrix theory are fundamental tools for almost every area of mathematics, both pu...
Linear algebra and matrix theory are fundamental tools for almost every area of mathematics, both pu...
To track the gradual change of the adjacency matrix of a simple graph $\mathcal{G}$ into the signle...
For a directed or undirected graph without loops we give formulae for the determinant and adjugate o...
Several established and novel applications motivate us to study the expressive power of navigational...
What part does algebra play in representing the real world abstractly? How can algebra be used to so...
Most graph query languages are rooted in logic. By contrast, in this paper we consider graph query l...
We investigate the expressive power of MATLANG, a formal language for matrix manipulation based on c...
The present article is designed to be a contribution to the chapter `Combinatorial Matrix Theory and...
We consider algorithms with access to an unknown matrix M in F^{n x d} via matrix-vector products, n...
We consider the general problem of learning about a matrix through vector-matrix-vector queries. The...
For almost all graphs the answer to the question in the title is still unknown. Here we survey the c...
In the context of the stability analysis of interdependent networks through the eigenvalue evaluatio...
In this article we establish relationships between Leavitt path algebras, talented monoids and the a...
This new edition illustrates the power of linear algebra in the study of graphs. The emphasis on mat...
Linear algebra and matrix theory are fundamental tools for almost every area of mathematics, both pu...
Linear algebra and matrix theory are fundamental tools for almost every area of mathematics, both pu...
To track the gradual change of the adjacency matrix of a simple graph $\mathcal{G}$ into the signle...
For a directed or undirected graph without loops we give formulae for the determinant and adjugate o...
Several established and novel applications motivate us to study the expressive power of navigational...
What part does algebra play in representing the real world abstractly? How can algebra be used to so...