Add to ORKGWe show that linear programming relaxations need sub-exponential size to beat trivial random guessing for approximately satisfying constraint satisfaction problems. In fact, we show that for such problems sub-exponential size relaxations are as powerful as n^(Omega(1))-rounds of Sherali-Adams hierarchy. Previously, only super-polynomial (~ n^(Omega(log n)) bounds were known any CSP [CLRS13]. Our bounds are obtained by exploiting and extending the recent progress in communication complexity for "lifting" query lower bounds to communication problems. The core of our results is a new decomposition theorem for "high-entropy rectangles" into structurally nice distributions and may be of independent interest in communication complexity. Joint w...
We prove exponential lower bounds on the running time of many algorithms for Constraint Satisfaction...
We study the fine-grained complexity of NP-complete satisfiability (SAT) problems and constraint sat...
We present two improvements for solving constraint satisfaction problems. First, we show that on pro...
We show that linear programming relaxations need sub-exponential size to beat trivial random guessin...
We study the approximability of constraint satisfaction problems (CSPs) by linear programming (LP) r...
We study the approximability of constraint satisfaction problems (CSPs) by linear programming (LP) r...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
We study the approximability of constraint satisfaction problems (CSPs) by linear programming (LP) r...
We initiate a study of when the value of mathematical relaxations such as linear and semi-definite p...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
AbstractLet Cn,m2,k,t be a random constraint satisfaction problem (CSP) on n binary variables, where...
Despite significant successes in understanding the hardness of computational problems based on stand...
A Constraint Satisfaction Problem (CSP) with n variables ranging over a domain of d values can be so...
We prove exponential lower bounds on the running time of many algorithms for Constraint Satisfaction...
We prove exponential lower bounds on the running time of many algorithms for Constraint Satisfaction...
We study the fine-grained complexity of NP-complete satisfiability (SAT) problems and constraint sat...
We present two improvements for solving constraint satisfaction problems. First, we show that on pro...
We show that linear programming relaxations need sub-exponential size to beat trivial random guessin...
We study the approximability of constraint satisfaction problems (CSPs) by linear programming (LP) r...
We study the approximability of constraint satisfaction problems (CSPs) by linear programming (LP) r...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
We study the approximability of constraint satisfaction problems (CSPs) by linear programming (LP) r...
We initiate a study of when the value of mathematical relaxations such as linear and semi-definite p...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
AbstractLet Cn,m2,k,t be a random constraint satisfaction problem (CSP) on n binary variables, where...
Despite significant successes in understanding the hardness of computational problems based on stand...
A Constraint Satisfaction Problem (CSP) with n variables ranging over a domain of d values can be so...
We prove exponential lower bounds on the running time of many algorithms for Constraint Satisfaction...
We prove exponential lower bounds on the running time of many algorithms for Constraint Satisfaction...
We study the fine-grained complexity of NP-complete satisfiability (SAT) problems and constraint sat...
We present two improvements for solving constraint satisfaction problems. First, we show that on pro...