Add to ORKGGiven an n-by-n Hermitian matrix A and a real number λ, index i is said to be Parter (resp. neutral, downer) if the multiplicity of λ as an eigenvalue of A(i) is one more (resp. the same, one less) than that in A. In case the multiplicity of λ in A is at least 2 and the graph of A is a tree, there are always Parter vertices. Our purpose here is to advance the classification of vertices and, in particular, to relate classification to the combinatorial structure of eigenspaces. Some general results are given and then used to deduce some rather specific facts, not otherwise easily observed. Examples are given
AbstractAmong the possible multiplicity lists for the eigenvalues of Hermitian matrices whose graph ...
AbstractWhen an edge is removed from an undirected graph, there is a limited change that can occur i...
AbstractThrough a succession of results, it is known that if the graph of an Hermitian matrix A is a...
For an Hermitian matrix whose graph is a tree and for a given eigenvalue having Parter vertices, the...
AbstractThere is remarkable and distinctive structure among Hermitian matrices, whose graph is a giv...
Abstract There is remarkable and distinctive structure among Hermitian matrices, whose graph is a gi...
Given a certain tree, we explore what we can infer about the eigenvalue multiplicities for a Hermiti...
An important theorem about the existence of principal submatrices of a Hermitian matrixwhose graph i...
AbstractLet A be a Hermitian matrix whose graph is G (i.e. there is an edge between the vertices i a...
There is remarkable and distinctive structure among Hermitian matrices, whose graph is a given tree ...
AbstractWe consider the general problem of determining which lists of multiplicities for the eigenva...
AbstractFor Hermitian matrices, whose graph is a given tree, the relationships among vertex degrees,...
Sem PDF conforme despacho.For a given graph, there is a natural question of the possible lists of mu...
Let λ be an eigenvalue of an n-by-n matrix A. The allowable patterns of geometric multiplicities of ...
AbstractLet λ be an eigenvalue of an n-by-n matrix A. The allowable patterns of geometric multiplici...
AbstractAmong the possible multiplicity lists for the eigenvalues of Hermitian matrices whose graph ...
AbstractWhen an edge is removed from an undirected graph, there is a limited change that can occur i...
AbstractThrough a succession of results, it is known that if the graph of an Hermitian matrix A is a...
For an Hermitian matrix whose graph is a tree and for a given eigenvalue having Parter vertices, the...
AbstractThere is remarkable and distinctive structure among Hermitian matrices, whose graph is a giv...
Abstract There is remarkable and distinctive structure among Hermitian matrices, whose graph is a gi...
Given a certain tree, we explore what we can infer about the eigenvalue multiplicities for a Hermiti...
An important theorem about the existence of principal submatrices of a Hermitian matrixwhose graph i...
AbstractLet A be a Hermitian matrix whose graph is G (i.e. there is an edge between the vertices i a...
There is remarkable and distinctive structure among Hermitian matrices, whose graph is a given tree ...
AbstractWe consider the general problem of determining which lists of multiplicities for the eigenva...
AbstractFor Hermitian matrices, whose graph is a given tree, the relationships among vertex degrees,...
Sem PDF conforme despacho.For a given graph, there is a natural question of the possible lists of mu...
Let λ be an eigenvalue of an n-by-n matrix A. The allowable patterns of geometric multiplicities of ...
AbstractLet λ be an eigenvalue of an n-by-n matrix A. The allowable patterns of geometric multiplici...
AbstractAmong the possible multiplicity lists for the eigenvalues of Hermitian matrices whose graph ...
AbstractWhen an edge is removed from an undirected graph, there is a limited change that can occur i...
AbstractThrough a succession of results, it is known that if the graph of an Hermitian matrix A is a...