We show that the ellipsoid method for solving linear programs can be implemented in a way that respects the symmetry of the program being solved. That is to say, there is an algorithmic implementation of the method that does not distinguish, or make choices, between variables or constraints in the program unless they are distinguished by properties definable from the program. In particular, we demonstrate that the solvability of linear programs can be expressed in fixed-point logic with counting (FPC) as long as the program is given by a separation oracle that is itself definable in FPC. We use this to show that the size of a maximum matching in a graph is definable in FPC. This settles an open problem first posed by Blass, Gurevich and She...
In this paper, we study Ellipsoid method and modified Ellipsoid method in order to find a point whic...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
In recent years, branch-and-cut algorithms have become firmly established as the most effective meth...
We establish the expressibility in fixed-point logic with counting (FPC) of a number of natural poly...
The ellipsoid method is an algorithm that solves the (weak) feasibility and linear optimization prob...
The ellipsoid method is an algorithm that solves the (weak) feasibility and linear optimization prob...
We show that the ellipsoid method for solving semidefinite programs (SDPs) can be expressed in fixed...
What is the value of input information in solving linear programming? The celebrated ellipsoid algor...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
We consider linear programming in the oracle model: mincT x s.t. x ∊ P, where the polyhedron P = {x ...
© 2019 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for a...
Cardinality constraints enforce an upper bound on the number of variables that can be nonzero. This ...
Cardinality constraints enforce an upper bound on the number of variables that can be nonzero. This ...
An algorithm that solves a linear program by using planes exterior to the feasible region is descri...
Abstract In recent years, branch-and-cut algorithms have become firmly established as the most effec...
In this paper, we study Ellipsoid method and modified Ellipsoid method in order to find a point whic...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
In recent years, branch-and-cut algorithms have become firmly established as the most effective meth...
We establish the expressibility in fixed-point logic with counting (FPC) of a number of natural poly...
The ellipsoid method is an algorithm that solves the (weak) feasibility and linear optimization prob...
The ellipsoid method is an algorithm that solves the (weak) feasibility and linear optimization prob...
We show that the ellipsoid method for solving semidefinite programs (SDPs) can be expressed in fixed...
What is the value of input information in solving linear programming? The celebrated ellipsoid algor...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
We consider linear programming in the oracle model: mincT x s.t. x ∊ P, where the polyhedron P = {x ...
© 2019 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for a...
Cardinality constraints enforce an upper bound on the number of variables that can be nonzero. This ...
Cardinality constraints enforce an upper bound on the number of variables that can be nonzero. This ...
An algorithm that solves a linear program by using planes exterior to the feasible region is descri...
Abstract In recent years, branch-and-cut algorithms have become firmly established as the most effec...
In this paper, we study Ellipsoid method and modified Ellipsoid method in order to find a point whic...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
In recent years, branch-and-cut algorithms have become firmly established as the most effective meth...