AbstractAn incomplete Lagrange function is introduced for a class of nonlinear programming problems which explains the reason behind the construction of the Mond–Weir–type dual. A mixed-type dual is presented for a class of fractional and generalized fractional programming problems, and various duality theorems are established. Several duals already reported in the literature follow as special cases of this study
AbstractIn this paper, Lagrange multiplier theorems are developed for the multiobjective fractional ...
AbstractIn this paper, we establish two theorems of alternative with generalized subconvexlikeness. ...
AbstractA very powerful approach to duality in mathematical programming is the theory of generalised...
AbstractAn incomplete Lagrange function is introduced for a class of nonlinear programming problems ...
Amixed type dual problem for minimax fractionaI programming concerning set functions is constructed ...
AbstractTwo mixed type duals are introduced for multiobjective programming and for multiobjective fr...
AbstractA pair of symmetric dual nonlinear fractional programming problems is presented and duality ...
In this paper, a dual of a given linear fractional program is defined and the weak, direct and conve...
In this paper, a dual of a given linear fractional program is defined and the weak, direct and conve...
A pair of symmetric dual nonlinear fractional programming problems is presented and duality theorems...
AbstractTwo dual problems are proposed for the minimax problem: minimize maxy ϵ Y φ(x, y), subject t...
A mixed symmetric dual formulation is presented for a class of nondifferentiable nonlinear programmi...
AbstractMaking use of a strong duality theorem for nonlinear programs involving n-set functions, we ...
A new dual type for ratio of integral variational programming is constructed by mixing the Wolfe typ...
AbstractThe concept of mixed-type duality has been extended to the class of multiobjective variation...
AbstractIn this paper, Lagrange multiplier theorems are developed for the multiobjective fractional ...
AbstractIn this paper, we establish two theorems of alternative with generalized subconvexlikeness. ...
AbstractA very powerful approach to duality in mathematical programming is the theory of generalised...
AbstractAn incomplete Lagrange function is introduced for a class of nonlinear programming problems ...
Amixed type dual problem for minimax fractionaI programming concerning set functions is constructed ...
AbstractTwo mixed type duals are introduced for multiobjective programming and for multiobjective fr...
AbstractA pair of symmetric dual nonlinear fractional programming problems is presented and duality ...
In this paper, a dual of a given linear fractional program is defined and the weak, direct and conve...
In this paper, a dual of a given linear fractional program is defined and the weak, direct and conve...
A pair of symmetric dual nonlinear fractional programming problems is presented and duality theorems...
AbstractTwo dual problems are proposed for the minimax problem: minimize maxy ϵ Y φ(x, y), subject t...
A mixed symmetric dual formulation is presented for a class of nondifferentiable nonlinear programmi...
AbstractMaking use of a strong duality theorem for nonlinear programs involving n-set functions, we ...
A new dual type for ratio of integral variational programming is constructed by mixing the Wolfe typ...
AbstractThe concept of mixed-type duality has been extended to the class of multiobjective variation...
AbstractIn this paper, Lagrange multiplier theorems are developed for the multiobjective fractional ...
AbstractIn this paper, we establish two theorems of alternative with generalized subconvexlikeness. ...
AbstractA very powerful approach to duality in mathematical programming is the theory of generalised...
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