Abstract: A novel approach to solving the problems of discrete (integer) optimization based on the numbering of points in the plane with integer coordinates, i. e. lattice points, is considered. An analytical description (in the closed form) of the whole point coordinates dependence on its number and the whole point number on its coordinates was found using the function antje. On this basis, it is proposed to avoid a preliminary solution of the problem of mathematical programming with weak constraints, i. e. excluding the requirements of integer variables, as in the methods of pruning and combinatorial methods. Finding the optimum of the objective function is carried out directly on the set of lattice points i. e. a subse...
We consider the integer points in a unimodular cone K ordered by a lexicographic rule defined by a l...
Lattices are an easy and clean class of periodic arrangements that are not only discrete but associa...
Rave reviews for INTEGER AND COMBINATORIAL OPTIMIZATION ""This book provides an excellent introduct...
The proposed work consists of two parts. The first of these is devoted to the analytical image of in...
Integer optimization is a powerful modeling tool both for problems of practical and more abstract or...
textabstractWe review and describe several results regarding integer programming problems in fixed d...
In this paper we present two general results on the existence of a discrete zero point of a function...
We present an algorithm for minimizing a convex function over all integer vectors in the plane. This...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
In this paper we present two theorems on the existence of a discrete zero point of a function from t...
Consider the optimization (i.e. maximization or minimization) of a real valued function f defined o...
Several questions related to integer lattice points on the plane occupy central positio
The paper describes an optimization procedure for a class of discrete optimization problems which is...
Typically, the search for solutions in discrete optimization problems is associated with fundamental...
We describe a common extension of the fundamental theorem of Linear Programming on the existence of ...
We consider the integer points in a unimodular cone K ordered by a lexicographic rule defined by a l...
Lattices are an easy and clean class of periodic arrangements that are not only discrete but associa...
Rave reviews for INTEGER AND COMBINATORIAL OPTIMIZATION ""This book provides an excellent introduct...
The proposed work consists of two parts. The first of these is devoted to the analytical image of in...
Integer optimization is a powerful modeling tool both for problems of practical and more abstract or...
textabstractWe review and describe several results regarding integer programming problems in fixed d...
In this paper we present two general results on the existence of a discrete zero point of a function...
We present an algorithm for minimizing a convex function over all integer vectors in the plane. This...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
In this paper we present two theorems on the existence of a discrete zero point of a function from t...
Consider the optimization (i.e. maximization or minimization) of a real valued function f defined o...
Several questions related to integer lattice points on the plane occupy central positio
The paper describes an optimization procedure for a class of discrete optimization problems which is...
Typically, the search for solutions in discrete optimization problems is associated with fundamental...
We describe a common extension of the fundamental theorem of Linear Programming on the existence of ...
We consider the integer points in a unimodular cone K ordered by a lexicographic rule defined by a l...
Lattices are an easy and clean class of periodic arrangements that are not only discrete but associa...
Rave reviews for INTEGER AND COMBINATORIAL OPTIMIZATION ""This book provides an excellent introduct...