Abstract. The classical matrix tree theorem relates the number of spanning trees of a connected graph with the product of the nonzero eigenvalues of its Laplacian matrix. The class of regular matroids generalizes that of graphical matroids, and a generalization of the matrix tree theorem holds for this wider class. We give a new, geometric proof of this fact by showing via a dissect-and-rearrange argument that two combinatorially distinct zonotopes associated to a regular matroid have the same volume. Along the way we prove that for a regular oriented matroid represented by a unimodular matrix, the lattice spanned by its cocircuits coincides with the lattice spanned by the rows of the representation matrix. Finally, by extending our setup t...
Bodlaender et al. [7] proved a converse to Courcelle's Theorem for graphs [15] for the class of chor...
Abstract. We show that the tree-width of a graph can be defined with-out reference to graph vertices...
The hitting number of a polytope P is the smallest size of a subset of vertices of P such that every...
AbstractOne of the classical results in graph theory is the matrix-tree theorem which asserts that t...
Abstract. We generalize the denition and enumeration of spanning trees from the setting of graphs to...
Abstract. We generalize the definition and enumeration of spanning trees from the setting of graphs ...
The classical Matrix-Tree Theorem allows one to list the spanning trees of a graph by monomials in ...
This new edition illustrates the power of linear algebra in the study of graphs. The emphasis on mat...
AbstractRayleigh monotonicity in Physics has a combinatorial interpretation. In this paper we give a...
In this article we provide a combinatorial description of an arbitrary minor of the Laplacian matrix...
Generalizing the classical matrix-tree theorem we provide a formula counting subgraphs of a given gr...
AbstractLet G be an undirected graph with vertices {v1,v2,…,>;v⋎} and edges {e1,e2, …,eϵ}. Let M be ...
Abstract. We prove a Matrix-Tree Theorem enumerating the spanning trees of a cell complex in terms o...
AbstractKishi and Kajitani introduced the concepts of the principal partition of a graph and maximal...
The Laplacian matrix of a graph $G$ is $L(G)=D(G)-A(G)$, where $A(G)$ is the adjacency matrix and $D...
Bodlaender et al. [7] proved a converse to Courcelle's Theorem for graphs [15] for the class of chor...
Abstract. We show that the tree-width of a graph can be defined with-out reference to graph vertices...
The hitting number of a polytope P is the smallest size of a subset of vertices of P such that every...
AbstractOne of the classical results in graph theory is the matrix-tree theorem which asserts that t...
Abstract. We generalize the denition and enumeration of spanning trees from the setting of graphs to...
Abstract. We generalize the definition and enumeration of spanning trees from the setting of graphs ...
The classical Matrix-Tree Theorem allows one to list the spanning trees of a graph by monomials in ...
This new edition illustrates the power of linear algebra in the study of graphs. The emphasis on mat...
AbstractRayleigh monotonicity in Physics has a combinatorial interpretation. In this paper we give a...
In this article we provide a combinatorial description of an arbitrary minor of the Laplacian matrix...
Generalizing the classical matrix-tree theorem we provide a formula counting subgraphs of a given gr...
AbstractLet G be an undirected graph with vertices {v1,v2,…,>;v⋎} and edges {e1,e2, …,eϵ}. Let M be ...
Abstract. We prove a Matrix-Tree Theorem enumerating the spanning trees of a cell complex in terms o...
AbstractKishi and Kajitani introduced the concepts of the principal partition of a graph and maximal...
The Laplacian matrix of a graph $G$ is $L(G)=D(G)-A(G)$, where $A(G)$ is the adjacency matrix and $D...
Bodlaender et al. [7] proved a converse to Courcelle's Theorem for graphs [15] for the class of chor...
Abstract. We show that the tree-width of a graph can be defined with-out reference to graph vertices...
The hitting number of a polytope P is the smallest size of a subset of vertices of P such that every...