DOIAbstract
AbstractWe prove a conjecture of Dubey et al. on the change in the resolvent of a nonnegative matrix if its entries are decreased, and discuss applications to mathematical economics
AbstractWe prove a conjecture of Dubey et al. on the change in the resolvent of a nonnegative matrix if its entries are decreased, and discuss applications to mathematical economics
It has long been known that totally nonnegative (or totally positive matrices) are closed under norm...
The goal of this paper is to explain how to derive from the resolvent of a matrix the following clas...
Eventually nonnegative matrices are square matrices whose powers become and remain (entrywise) nonne...
AbstractVarious explicit expansions of the resolvent of a square complex matrix in a neighborhood of...
AbstractWe prove a conjecture of Dubey et al. on the change in the resolvent of a nonnegative matrix...
We define a new average — termed the resolvent average — for positive semidefinite matrices. For pos...
AbstractIn the stability analysis of numerical processes the problem arises of establishing (moderat...
The aim of this manuscript is to understand the dynamics of products of nonnegative matrices. We ext...
It is shown that an important resolvent estimate is unstable under small perturbations
AbstractWe investigate an old suggestion of A.E. Brouwer we call decomposition, for constructing a c...
AbstractVarious explicit expansions of the resolvent of a square complex matrix in a neighborhood of...
AbstractWe define a new average – termed the resolvent average – for positive semidefinite matrices....
AbstractIn this paper, it is shown that the necessary and sufficient conditions on the Jordan form o...
In this paper we generalize Vere-Jones R-theory to reducible nonnegative matrices of countably infin...
AbstractFor a nonnegative matrix P, we discuss the relation of its marked reduced graph to that part...
It has long been known that totally nonnegative (or totally positive matrices) are closed under norm...
The goal of this paper is to explain how to derive from the resolvent of a matrix the following clas...
Eventually nonnegative matrices are square matrices whose powers become and remain (entrywise) nonne...
AbstractVarious explicit expansions of the resolvent of a square complex matrix in a neighborhood of...
AbstractWe prove a conjecture of Dubey et al. on the change in the resolvent of a nonnegative matrix...
We define a new average — termed the resolvent average — for positive semidefinite matrices. For pos...
AbstractIn the stability analysis of numerical processes the problem arises of establishing (moderat...
The aim of this manuscript is to understand the dynamics of products of nonnegative matrices. We ext...
It is shown that an important resolvent estimate is unstable under small perturbations
AbstractWe investigate an old suggestion of A.E. Brouwer we call decomposition, for constructing a c...
AbstractVarious explicit expansions of the resolvent of a square complex matrix in a neighborhood of...
AbstractWe define a new average – termed the resolvent average – for positive semidefinite matrices....
AbstractIn this paper, it is shown that the necessary and sufficient conditions on the Jordan form o...
In this paper we generalize Vere-Jones R-theory to reducible nonnegative matrices of countably infin...
AbstractFor a nonnegative matrix P, we discuss the relation of its marked reduced graph to that part...
It has long been known that totally nonnegative (or totally positive matrices) are closed under norm...
The goal of this paper is to explain how to derive from the resolvent of a matrix the following clas...
Eventually nonnegative matrices are square matrices whose powers become and remain (entrywise) nonne...
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