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Linear-fractional programming

Known as: Linear fractional programming, Linear-fractional programming (LFP) 
In mathematical optimization, linear-fractional programming (LFP) is a generalization of linear programming (LP). Whereas the objective function in a… 
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Related topics

Related topics

12 relations
Criss-cross algorithmDuality (optimization)Feasible regionFractional programming

Broader (1)

Operations research

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
2017
2017
Neutrosophic Linear Fractional Programming Problems
In this chapter, a solution procedure is proposed to solve neutrosophic linear fractional programming (NLFP) problem where cost… 
2014
2014
Optimising chromatography strategies of antibody purification processes by mixed integer fractional programming techniques
2013
2013
A Piecewise Linear Approximation Method to Solve Fuzzy Separable Quadratic Programming Problem
This paper presents a piecewise linear approximation method for solving separable quadratic programming problems by using linear… 
2011
2011
A Priority based Fuzzy Goal Programming to MultiObjective Linear Fractional Programming Problem
paper deals with priority based fuzzy goal programming approach for solving multi-objective linear fractional programming problem… 
2009
2009
On Solving Fully Fuzzified Linear Fractional Programs
In an earlier work [Pop and Stancu Minasian, 2008], we proposed a method of solving the fully fuzzified linear fractional… 
2009
2009
Approximate multi-parametric sensitivity analysis of the constraint matrix in piecewise linear fractional programming
In this paper, we study multi-parametric sensitivity analysis under perturbations in multiple rows or columns of the constraint… 
2007
2007
Optimizing the Linear Fractional Programming Problem with Max-Archimedean t-norm Fuzzy Relational Equation Constraints
In the literature, one of the minimal solutions is an optimal solution of solving a linear objective function subject to fuzzy… 
2004
2004
The controlled estimation method in the multiobjective linear fractional problem
1997
1997
Invariant Definability (Extended Abstract)
To prove the conjecture for this case we observe that if K 0 is FOL{deenable with equality only, then L = INV K0 (L) by… 
1968
1968
Duality in fractional programming
SummaryIn this paper, a dual problem to linear fractional functionals programming i. e. $$\begin{gathered} Maximise Z = \frac{{c… 
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