AbstractA very powerful approach to duality in mathematical programming is the theory of generalised geometric programming. Here we exploit this theory to develop a duality theory for fractional programs. All previous work on duality for such programs uses Lagrangian ideas
AbstractAn incomplete Lagrange function is introduced for a class of nonlinear programming problems ...
AbstractMaking use of a strong duality theorem for nonlinear programs involving n-set functions, we ...
AbstractA pair of symmetric dual nonlinear fractional programming problems is presented and duality ...
AbstractA very powerful approach to duality in mathematical programming is the theory of generalised...
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...
AbstractThis expository note develops Rockafellar's (1968, 1970) conjugate-duality theory for convex...
A duality theory using conjugate functions is established for mathematical programs that involve the...
A new dual problem for convex generalized fractional programs with no duality gap is presented and i...
AbstractEgudo derived some duality theorems for Multi-objective programs using the concept of effici...
Color poster with text and equations.In this presentation a dual of a linear fractional functionalsp...
AbstractIn this paper, a generalized ratio invexity concept has been applied for single objective fr...
AbstractThis paper presents a possible generalization of geometric programming problems. Such a gene...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...
A pair of symmetric dual nonlinear fractional programming problems is presented and duality theorems...
AbstractAn incomplete Lagrange function is introduced for a class of nonlinear programming problems ...
AbstractMaking use of a strong duality theorem for nonlinear programs involving n-set functions, we ...
AbstractA pair of symmetric dual nonlinear fractional programming problems is presented and duality ...
AbstractA very powerful approach to duality in mathematical programming is the theory of generalised...
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...
AbstractThis expository note develops Rockafellar's (1968, 1970) conjugate-duality theory for convex...
A duality theory using conjugate functions is established for mathematical programs that involve the...
A new dual problem for convex generalized fractional programs with no duality gap is presented and i...
AbstractEgudo derived some duality theorems for Multi-objective programs using the concept of effici...
Color poster with text and equations.In this presentation a dual of a linear fractional functionalsp...
AbstractIn this paper, a generalized ratio invexity concept has been applied for single objective fr...
AbstractThis paper presents a possible generalization of geometric programming problems. Such a gene...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...
A pair of symmetric dual nonlinear fractional programming problems is presented and duality theorems...
AbstractAn incomplete Lagrange function is introduced for a class of nonlinear programming problems ...
AbstractMaking use of a strong duality theorem for nonlinear programs involving n-set functions, we ...
AbstractA pair of symmetric dual nonlinear fractional programming problems is presented and duality ...
DOI
Add to ORKG