AbstractWe study graphs whose adjacency matrices have determinant equal to 1 or −1, and characterize certain subclasses of these graphs. Graphs whose adjacency matrices are totally unimodular are also characterized. For bipartite graphs having a unique perfect matching, we provide a formula for the inverse of the corresponding adjacency matrix, and address the problem of when that inverse is diagonally similar to a nonnegative matrix. Special attention is paid to the case that such a graph is unicyclic
[[abstract]]For a simple graph G, let rank(G) and dnzr(G) denote respectively the rank and the numbe...
Consider a graph Γ on n vertices with adjacency matrix A and degree sequence (d1,…,dn). A universal ...
AbstractConsider a graph Γ on n vertices with adjacency matrix A and degree sequence (d1,…,dn). A un...
summary:A graph is nonsingular if its adjacency matrix $A(G)$ is nonsingular. The inverse of a nonsi...
AbstractWe present a class of graphs whose adjacency matrices are nonsingular with integral inverses...
Let $X$ be bipartite mixed graph and for a unit complex number $\alpha$, $H_\alpha$ be its $\alpha$-...
For a directed or undirected graph without loops we give formulae for the determinant and adjugate o...
A graph is said to be singular if the determinant of its adjacency matrix is equal to zero. Otherwis...
AbstractIf G denotes a graph of order n, then the adjacency matrix of an orientation G→ of G can be ...
AbstractLet G be a simple graph, and consider an orientation of the edges of G. Where V is the verte...
AbstractProperties of a graph (directed or undirected) whose adjacency matrix is a circulant are stu...
AbstractA family of n×n symmetric circulant (0, 1) matrices is studied. It is shown that the determi...
AbstractLet G be a unicyclic graph with n vertices and the unique cycle C, A(G) and N(G) its adjacen...
Graph labeling where vertices and edges are assigned values subject to certain conditions have been ...
AbstractA property of unimodularity is introduced for antisymmetric integral matrices. It is satisfi...
[[abstract]]For a simple graph G, let rank(G) and dnzr(G) denote respectively the rank and the numbe...
Consider a graph Γ on n vertices with adjacency matrix A and degree sequence (d1,…,dn). A universal ...
AbstractConsider a graph Γ on n vertices with adjacency matrix A and degree sequence (d1,…,dn). A un...
summary:A graph is nonsingular if its adjacency matrix $A(G)$ is nonsingular. The inverse of a nonsi...
AbstractWe present a class of graphs whose adjacency matrices are nonsingular with integral inverses...
Let $X$ be bipartite mixed graph and for a unit complex number $\alpha$, $H_\alpha$ be its $\alpha$-...
For a directed or undirected graph without loops we give formulae for the determinant and adjugate o...
A graph is said to be singular if the determinant of its adjacency matrix is equal to zero. Otherwis...
AbstractIf G denotes a graph of order n, then the adjacency matrix of an orientation G→ of G can be ...
AbstractLet G be a simple graph, and consider an orientation of the edges of G. Where V is the verte...
AbstractProperties of a graph (directed or undirected) whose adjacency matrix is a circulant are stu...
AbstractA family of n×n symmetric circulant (0, 1) matrices is studied. It is shown that the determi...
AbstractLet G be a unicyclic graph with n vertices and the unique cycle C, A(G) and N(G) its adjacen...
Graph labeling where vertices and edges are assigned values subject to certain conditions have been ...
AbstractA property of unimodularity is introduced for antisymmetric integral matrices. It is satisfi...
[[abstract]]For a simple graph G, let rank(G) and dnzr(G) denote respectively the rank and the numbe...
Consider a graph Γ on n vertices with adjacency matrix A and degree sequence (d1,…,dn). A universal ...
AbstractConsider a graph Γ on n vertices with adjacency matrix A and degree sequence (d1,…,dn). A un...