We equivalently transform the sum of linear ratios programming problem into bilinear programming problem, then by using the linear characteristics of convex envelope and concave envelope of double variables product function, linear relaxation programming of the bilinear programming problem is given, which can determine the lower bound of the optimal value of original problem. Therefore, a branch and bound algorithm for solving sum of linear ratios programming problem is put forward, and the convergence of the algorithm is proved. Numerical experiments are reported to show the effectiveness of the proposed algorithm
In this paper, we develop an algorithm for minimizing the $L_{p} $ norm of a vector whose components...
AbstractThis paper considers the solution of generalized fractional programming (GFP) problem which ...
AbstractA global optimization algorithm is proposed in order to locate the global minimum of the spe...
Sum of ratios problem occurs frequently in various areas of engineering practice and management scie...
A new linearizing method is presented for globally solving sum of linear ratios problem with coeffic...
A global optimization algorithm is proposed for solving sum of general linear ratios problem (P) usi...
Since the sum of linear ratios problem (SLRP) has many applications in real life, for globally solvi...
AbstractThe nonlinear sum of ratios problem (P) has several important applications. However, it is a...
This paper presents a branch and bound algorithm for globally solving the sum of concave-convex rati...
We present a branch and bound algorithm for globally solving the sum of ratios problem. In this prob...
Abstract: "In this paper a new deterministic method for the global optimization of mathematical mode...
The sum-of-linear-ratios problem is the most difficult to globally solve among fractional pro-grammi...
AbstractThis article presents a simplicial branch and duality bound algorithm for globally solving t...
Abstract. We propose a method for finding a global optimal solution of programs with linear compleme...
The problem of maximizing the sum of m concave-convex fractional functions on a convex set is shown ...
In this paper, we develop an algorithm for minimizing the $L_{p} $ norm of a vector whose components...
AbstractThis paper considers the solution of generalized fractional programming (GFP) problem which ...
AbstractA global optimization algorithm is proposed in order to locate the global minimum of the spe...
Sum of ratios problem occurs frequently in various areas of engineering practice and management scie...
A new linearizing method is presented for globally solving sum of linear ratios problem with coeffic...
A global optimization algorithm is proposed for solving sum of general linear ratios problem (P) usi...
Since the sum of linear ratios problem (SLRP) has many applications in real life, for globally solvi...
AbstractThe nonlinear sum of ratios problem (P) has several important applications. However, it is a...
This paper presents a branch and bound algorithm for globally solving the sum of concave-convex rati...
We present a branch and bound algorithm for globally solving the sum of ratios problem. In this prob...
Abstract: "In this paper a new deterministic method for the global optimization of mathematical mode...
The sum-of-linear-ratios problem is the most difficult to globally solve among fractional pro-grammi...
AbstractThis article presents a simplicial branch and duality bound algorithm for globally solving t...
Abstract. We propose a method for finding a global optimal solution of programs with linear compleme...
The problem of maximizing the sum of m concave-convex fractional functions on a convex set is shown ...
In this paper, we develop an algorithm for minimizing the $L_{p} $ norm of a vector whose components...
AbstractThis paper considers the solution of generalized fractional programming (GFP) problem which ...
AbstractA global optimization algorithm is proposed in order to locate the global minimum of the spe...