Sublinear circuits are generalizations of the affine circuits in matroid theory, and they arise as the convex-combinatorial core underlying constrained non-negativity certificates of exponential sums and of polynomials based on the arithmetic-geometric inequality. Here, we study the polyhedral combinatorics of sublinear circuits for polyhedral constraint sets. We give results on the relation between the sublinear circuits and their supports and provide necessary as well as sufficient criteria for sublinear circuits. Based on these characterizations, we provide some explicit results and enumerations for two prominent polyhedral cases, namely the non-negative orthant and the cube [− 1,1]n
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
Abstract. We present an incremental polynomial-time algorithm for enumerating all circuits of a matr...
We present an incremental polynomial-time algorithm for enumerating all circuits of a matroid or, mo...
Sublinear circuits are generalizations of the affine circuits in matroid theory, and they arise as t...
Polyhedral combinatorics and the acyclic subdigraph problem. - Berlin : Heldermann, 1985. - X, 128 S...
AbstractIt is shown that each element of the lattice of meet (resp., join) sublattices of a product ...
AbstractA bimonotone linear inequality is a linear inequality with at most two nonzero coefficients ...
AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra a...
A bimonotone linear inequality is a linear inequality with at most two nonzero coefficients that are...
This chapter discusses polyhedral approaches in combinatorial optimization. Using a cutting-plane al...
International audienceWe study polytopes that are convex hulls of vectors of subgraph densities. Man...
AbstractA minimax theorem is proved. The theorem concerns packing non-separating circuits in euleria...
This thesis is a compendium of three studies on which matroids and convex geometry play a central ro...
An entirely new algorithm to find all the equilibrium points of piecewise-linear (PWL) circuits is p...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
Abstract. We present an incremental polynomial-time algorithm for enumerating all circuits of a matr...
We present an incremental polynomial-time algorithm for enumerating all circuits of a matroid or, mo...
Sublinear circuits are generalizations of the affine circuits in matroid theory, and they arise as t...
Polyhedral combinatorics and the acyclic subdigraph problem. - Berlin : Heldermann, 1985. - X, 128 S...
AbstractIt is shown that each element of the lattice of meet (resp., join) sublattices of a product ...
AbstractA bimonotone linear inequality is a linear inequality with at most two nonzero coefficients ...
AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra a...
A bimonotone linear inequality is a linear inequality with at most two nonzero coefficients that are...
This chapter discusses polyhedral approaches in combinatorial optimization. Using a cutting-plane al...
International audienceWe study polytopes that are convex hulls of vectors of subgraph densities. Man...
AbstractA minimax theorem is proved. The theorem concerns packing non-separating circuits in euleria...
This thesis is a compendium of three studies on which matroids and convex geometry play a central ro...
An entirely new algorithm to find all the equilibrium points of piecewise-linear (PWL) circuits is p...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
Abstract. We present an incremental polynomial-time algorithm for enumerating all circuits of a matr...
We present an incremental polynomial-time algorithm for enumerating all circuits of a matroid or, mo...