We develop a framework for proving approximation limits of polynomial-size linear programs from lower bounds on the nonnegative ranks of suitably defined matrices. This framework yields unconditional impossibility results that are applicable to any linear program as opposed to only programs generated by hierarchies. Using our framework, we prove that quadratic approximations for CLIQUE require linear programs of exponential size. (This lower bound applies to linear programs using a certain encoding of CLIQUE as a linear optimization problem) Moreover, we establish a similar result for approximations of semi definite programs by linear programs. Our main technical ingredient is a quantitative improvement of Razborov's rectangle corruption le...
Abstract We study a class of countably infinite linear programs (CILPs) whose feasible sets are bou...
AbstractMatrix rank minimization problems are gaining plenty of recent attention in both mathematica...
We characterize the complexity of some natural and important problems in linear algebra. In particul...
We develop a framework for proving approximation limits of polynomial size linear programs (LPs) fro...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
The matrix cuts of Lovász and Schrijver are methods for tightening linear relaxations of zero-one p...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
NP-complete combinatorial optimization problems are important and well-studied, but remain largely e...
Linear programming is a basic mathematical technique for optimizing a linear function on a domain th...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
International audienceWe consider the problem of minimizing a linear function over an affine section...
We consider $\epsilon$-approximation schemes for concave quadratic programming. Because the existin...
This talk surveys work on classifying the complexity and approximability of problems residing in the...
The problem of minimizing a quadratic form over the standard simplex is known as the standard quadra...
Abstract We study a class of countably infinite linear programs (CILPs) whose feasible sets are bou...
AbstractMatrix rank minimization problems are gaining plenty of recent attention in both mathematica...
We characterize the complexity of some natural and important problems in linear algebra. In particul...
We develop a framework for proving approximation limits of polynomial size linear programs (LPs) fro...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
The matrix cuts of Lovász and Schrijver are methods for tightening linear relaxations of zero-one p...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
NP-complete combinatorial optimization problems are important and well-studied, but remain largely e...
Linear programming is a basic mathematical technique for optimizing a linear function on a domain th...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
International audienceWe consider the problem of minimizing a linear function over an affine section...
We consider $\epsilon$-approximation schemes for concave quadratic programming. Because the existin...
This talk surveys work on classifying the complexity and approximability of problems residing in the...
The problem of minimizing a quadratic form over the standard simplex is known as the standard quadra...
Abstract We study a class of countably infinite linear programs (CILPs) whose feasible sets are bou...
AbstractMatrix rank minimization problems are gaining plenty of recent attention in both mathematica...
We characterize the complexity of some natural and important problems in linear algebra. In particul...