AbstractWe present a unifying framework to establish a lower bound on the number of semidefinite-programming-based lift-and-project iterations (rank) for computing the convex hull of the feasible solutions of various combinatorial optimization problems. This framework is based on the maps which are commutative with the lift-and-project operators. Some special commutative maps were originally observed by Lovász and Schrijver and have been used usually implicitly in the previous lower-bound analyses. In this paper, we formalize the lift-and-project commutative maps and propose a general framework for lower-bound analysis, in which we can recapture many of the previous lower-bound results on the lift-and-project ranks
In combinatorial optimization, many problems can be modeled by optimizing a linear functional over ...
Combinatorial optimization problems appear in many disciplines ranging from management and logistics...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
We present a unifying framework to establish a lower bound on the number of semidefinite-programming...
We consider lift-and-project methods for combinatorial optimization problems and focus mostly on tho...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
Abstract. This is an overview of the significance and main uses of projection, lifting and extended ...
In both mathematical research and real-life, we often encounter problems that can be framed as findi...
Lovasz and Schrijver (1991) described a semidcfinile operator for generating strong valid inequaliti...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
Hard combinatorial optimization problems are often approximated using linear or semidefinite program...
Since the early 1960s, polyhedral methods have played a central role in both the theory and practice...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
In combinatorial optimization, many problems can be modeled by optimizing a linear functional over ...
Combinatorial optimization problems appear in many disciplines ranging from management and logistics...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
We present a unifying framework to establish a lower bound on the number of semidefinite-programming...
We consider lift-and-project methods for combinatorial optimization problems and focus mostly on tho...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
Abstract. This is an overview of the significance and main uses of projection, lifting and extended ...
In both mathematical research and real-life, we often encounter problems that can be framed as findi...
Lovasz and Schrijver (1991) described a semidcfinile operator for generating strong valid inequaliti...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
Hard combinatorial optimization problems are often approximated using linear or semidefinite program...
Since the early 1960s, polyhedral methods have played a central role in both the theory and practice...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
We use techniques from (tracial noncommutative) polynomial optimization to formulate hierarchies of ...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
In combinatorial optimization, many problems can be modeled by optimizing a linear functional over ...
Combinatorial optimization problems appear in many disciplines ranging from management and logistics...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...