We consider the integer points in a unimodular cone K ordered by a lexicographic rule defined by a lattice basis. To each integer point x in K we associate a family of inequalities (lex-inequalities) that define the convex hull of the integer points in K that are not lexicographically smaller than x. The family of lex-inequalities contains the Chvátal–Gomory cuts, but does not contain and is not contained in the family of split cuts. This provides a finite cutting plane method to solve the integer program min{:∈∩ℤ}, where ⊂ℝ is a compact set and ∈ℤ. We analyze the number of iterations of our algorithm
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
A cutting plane technique with applicability to the solution of general integer programs is presente...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
AbstractThis paper establishes a new class of finitely convergent cutting plane methods to solve int...
textabstractWe review and describe several results regarding integer programming problems in fixed d...
Integer programming has many applications in economics and management. Apply-ing lexicographic order...
w9255960 Integer programming (IP) problems are difficult to solve due to the integer restrictions im...
An algorithm is presented for solving families of integer linear programming problems in which the p...
We analyze the properties of an interior point cutting plane algorithm that is based on a semi-infin...
Integer programming (IP) problems are difficult to solve due to the integer restrictions imposed on ...
The Dantzig-Wolfe decomposition has been extended to Integer Linear Programming (ILP) and Mixed Inte...
This dissertation is devoted to solving general mixed integer optimization problems. Our main focus ...
Approximate integer programming is the following: For a given convex body K⊆ Rn, either determine wh...
We study a mixed integer linear program with m integer variables and k non-negative continu...
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
A cutting plane technique with applicability to the solution of general integer programs is presente...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
AbstractThis paper establishes a new class of finitely convergent cutting plane methods to solve int...
textabstractWe review and describe several results regarding integer programming problems in fixed d...
Integer programming has many applications in economics and management. Apply-ing lexicographic order...
w9255960 Integer programming (IP) problems are difficult to solve due to the integer restrictions im...
An algorithm is presented for solving families of integer linear programming problems in which the p...
We analyze the properties of an interior point cutting plane algorithm that is based on a semi-infin...
Integer programming (IP) problems are difficult to solve due to the integer restrictions imposed on ...
The Dantzig-Wolfe decomposition has been extended to Integer Linear Programming (ILP) and Mixed Inte...
This dissertation is devoted to solving general mixed integer optimization problems. Our main focus ...
Approximate integer programming is the following: For a given convex body K⊆ Rn, either determine wh...
We study a mixed integer linear program with m integer variables and k non-negative continu...
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
A cutting plane technique with applicability to the solution of general integer programs is presente...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...