Results 21 to 30 of about 6,627 (303)

Evaluating fuzzy inequalities and solving fully fuzzified linear fractional programs [PDF]

open access: yesYugoslav Journal of Operations Research, 2012
In our earlier articles, we proposed two methods for solving the fully fuzzified linear fractional programming (FFLFP) problems. In this paper, we introduce a different approach of evaluating fuzzy inequalities between two triangular fuzzy numbers and
Stanojević B., Stancu-Minasian I.M.
doaj   +1 more source

A New Approach to Solving Linear Fractional Programming Problem with Rough Interval Coefficients in the Objective Function

open access: yesIbn Al-Haitham Journal for Pure and Applied Sciences, 2022
This paper presents a linear fractional programming problem (LFPP) with rough interval coefficients (RICs) in the objective function. It shows that the LFPP with RICs in the objective function can be converted into a linear programming problem (LPP) with
Rebaz B. Mustafa, Nejmaddin A Sulaiman
doaj   +1 more source

Stabilization of a fractional-order chain of integrators: a contraction-based approach [PDF]

open access: yes, 2013
In this paper, stabilization of a chain of fractional-order integrators is attempted. The stability is proved using contraction analysis.
SPURGEON, S   +8 more
core   +1 more source

A new method for solving quadratic fractional programming problem in neutrosophic environment

open access: yesOpen Engineering, 2021
In the current study, a neutrosophic quadratic fractional programming (NQFP) problem is investigated using a new method. The NQFP problem is converted into the corresponding quadratic fractional programming (QFP) problem.
Khalifa Hamiden Abd El-Wahed   +2 more
doaj   +1 more source

Scaling problems in linear-fractional programing [PDF]

open access: yes28th International Conference on Information Technology Interfaces, 2006., 2006
Summary: In this paper we discuss the theoretical backgrounds and implementation issues of scaling a linear-fractional programming (LFP) problem. We consider an LFP problem in the canonical form and show how to scale rows and columns of the problem. Then, when the scaled problem is solved, we show how the solution obtained may be un-scaled.
Bajalinov, Erik, Rácz, Anett
openaire   +2 more sources

Linear fractional program under interval and ellipsoidal uncertainty [PDF]

open access: yes, 2013
summary:In this paper, the robust counterpart of the linear fractional programming problem under linear inequality constraints with the interval and ellipsoidal uncertainty sets is studied.
Salahi, Maziar, Fallahi, Saeed
core   +1 more source

Fully intuitionistic fuzzy multi-level linear fractional programming problem

open access: yesAlexandria Engineering Journal, 2023
In many real situations, it is frequently difficult to accurately determine the membership and non-membership degrees related to an element of the set with complete satisfaction because of the ambiguity in the input data.
E. Fathy, E. Ammar, M.A. Helmy
doaj   +1 more source

A novel computational method for neutrosophic uncertainty related quadratic fractional programming problems [PDF]

open access: yesNeutrosophic Sets and Systems, 2023
This study introduces a novel method for addressing the pentagonal quadratic fractional programming problem (PQFPP). We employ pentagonal neutrosophic numbers for the objective function's cost, resources, and technological coefficients.
S.A. Edalatpanah   +3 more
doaj   +1 more source

Linear Fractional Programming Based on Trapezoidal Neutrosophic Numbers

open access: yes, 2021
In this paper, we introduce a new solution technique for resolving the neutrosophic linear fractional programming problem, where the objective function’s coefficients are neutrosophic trapezoidal-numbers.
M. Abdelfadel, A.   +3 more
core   +1 more source

A solution approach to the multi-level linear fractional programming problems [PDF]

open access: yesIranian Journal of Numerical Analysis and Optimization
In this paper, we consider multi-level linear fractional programming problems over a bounded polytope set. We present a characterization of the optimum solution to the $n$-level linear fractional programming problem for case $n > 2$.
Akram Baghalnezhad, Habibe Sadeghi
doaj   +1 more source

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