Let A be a 0 - 1 matrix with precisely two 1's in each column and let 1 be the all-one vector. We show that the problems of deciding whether the linear system Ax ≥ 1,x ≥ 0 (1) defines an integral polyhedron, (2) is totally dual integral (TDI), and (3) box-totally dual integral (box-TDI) are all co-NP-complete, thereby confirming the conjecture on NP-hardness of recognizing TDI systems made by Edmonds and Giles in 1984. © 2007 Springer-Verlag.preprin
AbstractWe consider a system of linear inequalities with {0,±1} coefficients and a right-hand side g...
The strong Chvátal rank of a rational matrix A is the smallest number t such that the polyhedron def...
AbstractLet P be the polyhedron given by P={xϵRn:Nx=0, a⩽x⩽b} , where N is a totally unimodular matr...
Let A be a 0 - 1 matrix with precisely two 1\u27s in each column and let 1 be the all-one vector. We...
AbstractWe prove that each (rational) polyhedron of full dimension is determined by a unique minimal...
AbstractLet A be a rational (m×n)-matrix and b be a rational m-vector. The linear system Ax≤b is sai...
AbstractA linear system Ax ⩽ b (A, b rational) is said to be totally dual integral (TDI) if for any ...
This thesis deals with the existence and description of integer solutions to max-linear systems. It ...
AbstractLet G be a graph and let A be its cutset-edge incidence matrix. We prove that the linear sys...
A vector is dyadic if each of its entries is a dyadic rational number, i.e. of the form a2k for some...
Let G = (V,E) be a graph. The matching polytope of G, denoted by P(G), is the convex hull of the inc...
In this paper we study systems of the form $b\leq Mx\leq d$, $l\leq x\leq u$, where $M$ is obtained ...
In this paper, we consider solving the integer linear systems, i.e., given a matrix A in R^{m*n}, a...
Let G be a graph and let A be its cutset-edge incidence matrix. We prove that the linear system frac...
peer reviewedA polyhedron is box-integer if its intersection with any integer box {ℓ≤x≤u} is integer...
AbstractWe consider a system of linear inequalities with {0,±1} coefficients and a right-hand side g...
The strong Chvátal rank of a rational matrix A is the smallest number t such that the polyhedron def...
AbstractLet P be the polyhedron given by P={xϵRn:Nx=0, a⩽x⩽b} , where N is a totally unimodular matr...
Let A be a 0 - 1 matrix with precisely two 1\u27s in each column and let 1 be the all-one vector. We...
AbstractWe prove that each (rational) polyhedron of full dimension is determined by a unique minimal...
AbstractLet A be a rational (m×n)-matrix and b be a rational m-vector. The linear system Ax≤b is sai...
AbstractA linear system Ax ⩽ b (A, b rational) is said to be totally dual integral (TDI) if for any ...
This thesis deals with the existence and description of integer solutions to max-linear systems. It ...
AbstractLet G be a graph and let A be its cutset-edge incidence matrix. We prove that the linear sys...
A vector is dyadic if each of its entries is a dyadic rational number, i.e. of the form a2k for some...
Let G = (V,E) be a graph. The matching polytope of G, denoted by P(G), is the convex hull of the inc...
In this paper we study systems of the form $b\leq Mx\leq d$, $l\leq x\leq u$, where $M$ is obtained ...
In this paper, we consider solving the integer linear systems, i.e., given a matrix A in R^{m*n}, a...
Let G be a graph and let A be its cutset-edge incidence matrix. We prove that the linear system frac...
peer reviewedA polyhedron is box-integer if its intersection with any integer box {ℓ≤x≤u} is integer...
AbstractWe consider a system of linear inequalities with {0,±1} coefficients and a right-hand side g...
The strong Chvátal rank of a rational matrix A is the smallest number t such that the polyhedron def...
AbstractLet P be the polyhedron given by P={xϵRn:Nx=0, a⩽x⩽b} , where N is a totally unimodular matr...