The strong Chvátal rank of a rational matrix A is the smallest number t such that the polyhedron defined by the system b <= A x <= c, l <= x <= u has Chvátal rank at most t for all integral vectors b,c,l,u. Matrices with strong Chvátal rank at most 1 are said to have the Edmonds-Johnson property. There are two main classes of matrices known to have the Edmonds-Johnson property, one was introduced by Edmonds and Johnson, and the other by Gerards and Schrijver. Characterizing integral matrices with the Edmonds-Johnson property seems complicated. However, Gerards and Schrijver noticed that there are some openings if we restrict ourselves to totally half-modular matrices, and they conjectured a characterization of totally half-modular matric...
We characterize the class of integral square matrices M having the property that for every integral ...
AbstractGiven integers t, k, and v such that 0⩽t⩽k⩽v, let Wtk(v) be the inclusion matrix of t-subset...
We consider the decision problem asking whether a partial rational symmetric matrix with an all-ones...
In this paper we study totally half-modular matrices obtained from {0,±1}-matrices with at most two ...
In this paper we study systems of the form $b\leq Mx\leq d$, $l\leq x\leq u$, where $M$ is obtained ...
AbstractIn this paper we examine two possible generalisations of total unimodularity, viz., total k-...
AbstractLet A be a rational (m×n)-matrix and b be a rational m-vector. The linear system Ax≤b is sai...
Given a p×q nonnegative matrix M, the psd rank of MM is the smallest integer k such that there exist...
AbstractLet E=[eij] be a matrix with integral elements. We study matrices of the form X=[eeij], wher...
The main topic of this paper is the matrix V = A - XY*, where A is a nonsingular complex k x k matri...
Let A be a 0 - 1 matrix with precisely two 1's in each column and let 1 be the all-one vector. We sh...
An n× n matrix X is called completely positive semidefinite (cpsd) if there exist d× d Hermitian pos...
AbstractEarlier results by Marshall Hall on integral completions of matrices satisfying orthogonalit...
AbstractWe consider a system of linear inequalities with {0,±1} coefficients and a right-hand side g...
For Hilbert spaces $\s X, \s Y$, the set of maximally entangled states, $\MES_{\s X, \s Y}$, is a se...
We characterize the class of integral square matrices M having the property that for every integral ...
AbstractGiven integers t, k, and v such that 0⩽t⩽k⩽v, let Wtk(v) be the inclusion matrix of t-subset...
We consider the decision problem asking whether a partial rational symmetric matrix with an all-ones...
In this paper we study totally half-modular matrices obtained from {0,±1}-matrices with at most two ...
In this paper we study systems of the form $b\leq Mx\leq d$, $l\leq x\leq u$, where $M$ is obtained ...
AbstractIn this paper we examine two possible generalisations of total unimodularity, viz., total k-...
AbstractLet A be a rational (m×n)-matrix and b be a rational m-vector. The linear system Ax≤b is sai...
Given a p×q nonnegative matrix M, the psd rank of MM is the smallest integer k such that there exist...
AbstractLet E=[eij] be a matrix with integral elements. We study matrices of the form X=[eeij], wher...
The main topic of this paper is the matrix V = A - XY*, where A is a nonsingular complex k x k matri...
Let A be a 0 - 1 matrix with precisely two 1's in each column and let 1 be the all-one vector. We sh...
An n× n matrix X is called completely positive semidefinite (cpsd) if there exist d× d Hermitian pos...
AbstractEarlier results by Marshall Hall on integral completions of matrices satisfying orthogonalit...
AbstractWe consider a system of linear inequalities with {0,±1} coefficients and a right-hand side g...
For Hilbert spaces $\s X, \s Y$, the set of maximally entangled states, $\MES_{\s X, \s Y}$, is a se...
We characterize the class of integral square matrices M having the property that for every integral ...
AbstractGiven integers t, k, and v such that 0⩽t⩽k⩽v, let Wtk(v) be the inclusion matrix of t-subset...
We consider the decision problem asking whether a partial rational symmetric matrix with an all-ones...