A global optimization algorithm is proposed for solving sum of general linear ratios problem (P) using new pruning technique. Firstly, an equivalent problem (P1) of the (P) is derived by exploiting the characteristics of linear constraints. Then, by utilizing linearization method the relaxation linear programming (RLP) of the (P1) can be constructed and the proposed algorithm is convergent to the global minimum of the (P) through the successive refinement of the linear relaxation of feasible region and solutions of a series of (RLP). Then, a new pruning technique is proposed, this technique offers a possibility to cut away a large part of the current investigated feasible region by the optimization algorithm, which can be utilized as an acc...
This paper is concerned with an efficient global optimization algorithm for solving a kind of fracti...
In this paper, a new algorithm is proposed for the solutions of system of nonlinear equations. This ...
AbstractThis paper considers the solution of generalized fractional programming (GFP) problem which ...
We equivalently transform the sum of linear ratios programming problem into bilinear programming pro...
A new linearizing method is presented for globally solving sum of linear ratios problem with coeffic...
AbstractThe nonlinear sum of ratios problem (P) has several important applications. However, it is a...
We present a branch and bound algorithm for globally solving the sum of ratios problem. In this prob...
Since the sum of linear ratios problem (SLRP) has many applications in real life, for globally solvi...
Sum of ratios problem occurs frequently in various areas of engineering practice and management scie...
This paper presents a branch and bound algorithm for globally solving the sum of concave-convex rati...
In this paper, we develop an algorithm for minimizing the $L_{p} $ norm of a vector whose components...
A global optimization algorithm for solving generalized geometric programming (GGP) problem is devel...
Abstract. We propose a method for finding a global optimal solution of programs with linear compleme...
The sum-of-linear-ratios problem is the most difficult to globally solve among fractional pro-grammi...
The sum of ratios optimization problem appears in many different communications applications and the...
This paper is concerned with an efficient global optimization algorithm for solving a kind of fracti...
In this paper, a new algorithm is proposed for the solutions of system of nonlinear equations. This ...
AbstractThis paper considers the solution of generalized fractional programming (GFP) problem which ...
We equivalently transform the sum of linear ratios programming problem into bilinear programming pro...
A new linearizing method is presented for globally solving sum of linear ratios problem with coeffic...
AbstractThe nonlinear sum of ratios problem (P) has several important applications. However, it is a...
We present a branch and bound algorithm for globally solving the sum of ratios problem. In this prob...
Since the sum of linear ratios problem (SLRP) has many applications in real life, for globally solvi...
Sum of ratios problem occurs frequently in various areas of engineering practice and management scie...
This paper presents a branch and bound algorithm for globally solving the sum of concave-convex rati...
In this paper, we develop an algorithm for minimizing the $L_{p} $ norm of a vector whose components...
A global optimization algorithm for solving generalized geometric programming (GGP) problem is devel...
Abstract. We propose a method for finding a global optimal solution of programs with linear compleme...
The sum-of-linear-ratios problem is the most difficult to globally solve among fractional pro-grammi...
The sum of ratios optimization problem appears in many different communications applications and the...
This paper is concerned with an efficient global optimization algorithm for solving a kind of fracti...
In this paper, a new algorithm is proposed for the solutions of system of nonlinear equations. This ...
AbstractThis paper considers the solution of generalized fractional programming (GFP) problem which ...