Given a combinatorially symmetric matrix A whose graph is a tree T and its eigenvalues, edges in T can be classified in four categories, based upon the change in geometric multiplicity of a particular eigenvalue, when the edge is removed. We investigate a necessary and sufficient condition for each classification of edges. We have similar results as the case for real symmetric matrices whose graph is a tree. We show that a g-2-Parter edge, a g-Parter edge and a g-downer edge are located separately from each other in a tree, and there is a g-neutral edge between them. Furthermore, we show that the distance between a g-downer edge and a g-2-Parter edge or a g-Parter edge is at least 2 in a tree. Lastly we give a combinatorially symmetric matr...
UID/MAT/00297/2019Considered are combinatorially symmetric matrices, whose graph is a given tree, in...
The main goal of this paper is to use a variation of the Kronecker product of matrices in order to o...
Abstract There is remarkable and distinctive structure among Hermitian matrices, whose graph is a gi...
Considered are combinatorially symmetric matrices, whose graph is a given tree, in view of the fact ...
We take as given a real symmetric matrix A, whose graph is a tree T, and the eigenvalues of A, with ...
Let T be a tree, let S(T) denote the set of real symmetric matrices whose graph is T, and let U(T) b...
We characterize the possible lists of multiplicities occurring among the eigenvalues of real symmetr...
Given a certain tree, we explore what we can infer about the eigenvalue multiplicities for a Hermiti...
We provide a combinatorial description of all the minors of the edge version of the Laplacian matrix...
AbstractLet A be a Hermitian matrix whose graph is G (i.e. there is an edge between the vertices i a...
In the theory of multiplicities for eigenvalues of symmetric matrices whose graph is a tree, it prov...
AbstractLet T denote a tree with at least three vertices. Observe that T contains a vertex which has...
AbstractWe characterize the possible lists of ordered multiplicities among matrices whose graph is a...
AbstractWhen an edge is removed from an undirected graph, there is a limited change that can occur i...
AbstractAmong those real symmetric matrices whose graph is a given tree T, the maximum multiplicity ...
UID/MAT/00297/2019Considered are combinatorially symmetric matrices, whose graph is a given tree, in...
The main goal of this paper is to use a variation of the Kronecker product of matrices in order to o...
Abstract There is remarkable and distinctive structure among Hermitian matrices, whose graph is a gi...
Considered are combinatorially symmetric matrices, whose graph is a given tree, in view of the fact ...
We take as given a real symmetric matrix A, whose graph is a tree T, and the eigenvalues of A, with ...
Let T be a tree, let S(T) denote the set of real symmetric matrices whose graph is T, and let U(T) b...
We characterize the possible lists of multiplicities occurring among the eigenvalues of real symmetr...
Given a certain tree, we explore what we can infer about the eigenvalue multiplicities for a Hermiti...
We provide a combinatorial description of all the minors of the edge version of the Laplacian matrix...
AbstractLet A be a Hermitian matrix whose graph is G (i.e. there is an edge between the vertices i a...
In the theory of multiplicities for eigenvalues of symmetric matrices whose graph is a tree, it prov...
AbstractLet T denote a tree with at least three vertices. Observe that T contains a vertex which has...
AbstractWe characterize the possible lists of ordered multiplicities among matrices whose graph is a...
AbstractWhen an edge is removed from an undirected graph, there is a limited change that can occur i...
AbstractAmong those real symmetric matrices whose graph is a given tree T, the maximum multiplicity ...
UID/MAT/00297/2019Considered are combinatorially symmetric matrices, whose graph is a given tree, in...
The main goal of this paper is to use a variation of the Kronecker product of matrices in order to o...
Abstract There is remarkable and distinctive structure among Hermitian matrices, whose graph is a gi...