Add to ORKGAbstract. This paper treats two topics: matrices with sign patterns and Jacobians of certain mappings on the nonnegative orthant Rd≥0. The main topic is counting the number of positive and negative coefficients in the determinant expansion of sign patterns and of these Jacobians. The paper is motivated by an approach to chemical networks initiated by Craciun and Feinberg. We also give a graph-theoretic test for determining when the sign pattern of the Jacobian of a chemical reaction dynamics is unambiguous. 1
We investigate matrices which have a positive eigenvalue by virtue of their sign--pattern and regard...
(eng) Computation of the sign of the determinant of a matrix and determinant itself is a challenge f...
Certified computation of the sign of the determinant of a matrix and determinant itself is a challen...
Abstract. Most differential equations found in chemical reaction networks (CRNs) have the form: dx d...
A determinantal formula for Hessenberg matrices is presented. The formula uses paths in an associate...
AbstractA result of Johnson, Leighton, and Robinson characterizing sign patterns of real matrices wi...
The Jacobian matrix of a dynamic system and its principal minors play a prominent role in the study ...
AbstractThe condition that a Hermitian matrix is diagonally signed (complementary) has recently been...
In stable biological and ecological networks, the steady-state influence matrix gathers the signs of...
In stable biological and ecological networks, the steady-state influence matrix gathers the signs of...
This thesis presents how Coates and Konig digraphs were applied to determinants. Each of these digra...
AbstractWe first characterize the n-by-n irreducible sign-pattern matrices A that are sign idempoten...
In this paper, we discuss the controllability of a family of linear time-invariant (LTI) networks de...
We provide combinatorial interpretations for determinants which are Fibonacci numbers of several rec...
AbstractWe determine here the +, -,0 sign patterns which occur among the inverses of nonsingular, en...
We investigate matrices which have a positive eigenvalue by virtue of their sign--pattern and regard...
(eng) Computation of the sign of the determinant of a matrix and determinant itself is a challenge f...
Certified computation of the sign of the determinant of a matrix and determinant itself is a challen...
Abstract. Most differential equations found in chemical reaction networks (CRNs) have the form: dx d...
A determinantal formula for Hessenberg matrices is presented. The formula uses paths in an associate...
AbstractA result of Johnson, Leighton, and Robinson characterizing sign patterns of real matrices wi...
The Jacobian matrix of a dynamic system and its principal minors play a prominent role in the study ...
AbstractThe condition that a Hermitian matrix is diagonally signed (complementary) has recently been...
In stable biological and ecological networks, the steady-state influence matrix gathers the signs of...
In stable biological and ecological networks, the steady-state influence matrix gathers the signs of...
This thesis presents how Coates and Konig digraphs were applied to determinants. Each of these digra...
AbstractWe first characterize the n-by-n irreducible sign-pattern matrices A that are sign idempoten...
In this paper, we discuss the controllability of a family of linear time-invariant (LTI) networks de...
We provide combinatorial interpretations for determinants which are Fibonacci numbers of several rec...
AbstractWe determine here the +, -,0 sign patterns which occur among the inverses of nonsingular, en...
We investigate matrices which have a positive eigenvalue by virtue of their sign--pattern and regard...
(eng) Computation of the sign of the determinant of a matrix and determinant itself is a challenge f...
Certified computation of the sign of the determinant of a matrix and determinant itself is a challen...