AbstractIn this paper, we give necessary and sufficient conditions for a set of Jordan blocks to correspond to the peripheral spectrum of a nonnegative matrix. For each eigenvalue, λ, the λ-level characteristic (with respect to the spectral radius) is defined. The necessary and sufficient conditions include a requirement that the λ-level characteristic is majorized by the λ-height characteristic. An algorithm which has been implemented in MATLAB is given to determine when a multiset of Jordan blocks corresponds to the peripheral spectrum of a nonnegative matrix. The algorithm is based on the necessary and sufficient conditions given in this paper
AbstractLet A be a nonnegative matrix with spectrum (λ1,λ2,…,λm) and B be a nonnegative matrix with ...
The major obstacle to determination of the Jordan chains for a highly degenerated eigenproblem is th...
The Frobenius normal form of a matrix is an important tool in analyzing its properties. When a matri...
AbstractIn this paper, we give necessary and sufficient conditions for a set of Jordan blocks to cor...
AbstractIn this paper we provide a necessary and sufficient condition for a collection of Jordan blo...
Nonnegative and eventually nonnegative matrices are useful in many areas of mathematics and have bee...
AbstractIf a set Δ of complex numbers can be partitioned as Δ=Λ1∪⋯∪Λs in such a way that each Λi is ...
AbstractLet P and E be two n × n complex matrices such that for sufficiently small positive ε, P + ε...
AbstractThe spectrum σ of a non-negative Jacobi matrix J is characterized. If J is also required to ...
AbstractWe introduce the concepts of peak characteristic of an M-matrix A and of peak signature and ...
For decades considerable efforts have been exerted to resolve the inverse eigenvalue problem for non...
Abstract A geometrical representation of the set of four complex numbers which are the spectrum of 4...
AbstractLet Lk0 denote the class of n × n Z-matrices A = tl − B with B ⩾ 0 and ϱk(B) ⩽ t < ϱk + 1(B)...
18 pagesInternational audienceWe show that the joint spectral radius of a finite collection of nonne...
AbstractWe prove that the sequence of eigencones (i.e., cones of nonnegative eigenvectors) of positi...
AbstractLet A be a nonnegative matrix with spectrum (λ1,λ2,…,λm) and B be a nonnegative matrix with ...
The major obstacle to determination of the Jordan chains for a highly degenerated eigenproblem is th...
The Frobenius normal form of a matrix is an important tool in analyzing its properties. When a matri...
AbstractIn this paper, we give necessary and sufficient conditions for a set of Jordan blocks to cor...
AbstractIn this paper we provide a necessary and sufficient condition for a collection of Jordan blo...
Nonnegative and eventually nonnegative matrices are useful in many areas of mathematics and have bee...
AbstractIf a set Δ of complex numbers can be partitioned as Δ=Λ1∪⋯∪Λs in such a way that each Λi is ...
AbstractLet P and E be two n × n complex matrices such that for sufficiently small positive ε, P + ε...
AbstractThe spectrum σ of a non-negative Jacobi matrix J is characterized. If J is also required to ...
AbstractWe introduce the concepts of peak characteristic of an M-matrix A and of peak signature and ...
For decades considerable efforts have been exerted to resolve the inverse eigenvalue problem for non...
Abstract A geometrical representation of the set of four complex numbers which are the spectrum of 4...
AbstractLet Lk0 denote the class of n × n Z-matrices A = tl − B with B ⩾ 0 and ϱk(B) ⩽ t < ϱk + 1(B)...
18 pagesInternational audienceWe show that the joint spectral radius of a finite collection of nonne...
AbstractWe prove that the sequence of eigencones (i.e., cones of nonnegative eigenvectors) of positi...
AbstractLet A be a nonnegative matrix with spectrum (λ1,λ2,…,λm) and B be a nonnegative matrix with ...
The major obstacle to determination of the Jordan chains for a highly degenerated eigenproblem is th...
The Frobenius normal form of a matrix is an important tool in analyzing its properties. When a matri...