Results 251 to 260 of about 437,555 (335)

Integer programming for learning directed acyclic graphs from nonidentifiable Gaussian models. [PDF]

Biometrika
Xu T, Taeb A, Küçükyavuz S, Shojaie A.   +3 more
europepmc   +1 more source

Neutrosophic goal programming technique with bio inspired algorithms for crop land allocation problem. [PDF]

Sci Rep
Angammal S, Grace GH.
europepmc   +1 more source

NOMA-MIMO in 5G network: a detailed survey on enhancing data rate. [PDF]

PeerJ Comput Sci
Halabouni M, Roslee M, Mitani S, Abuajwa O, Osman A, Binti Ali FZ, Waseem A.   +6 more
europepmc   +1 more source

NMAsurv: An R Shiny application for network meta-analysis based on survival data. [PDF]

Res Synth Methods
Shao T, Zhao M, Shi F, Rui M, Tang W.
europepmc   +1 more source

Brain Abnormalities in Children Exposed Prenatally to the Pesticide Chlorpyrifos.

JAMA Neurol
Peterson BS, Delavari S, Bansal R, Sawardekar S, Gupte C, Andrews H, Hoepner LA, Garcia W, Perera F, Rauh V.   +9 more
europepmc   +1 more source

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A new deterministic global computing algorithm for solving a kind of linear fractional programming

Optimization, 2022
This paper investigates a class of linear fractional programming (LFP) problem, which minimizes the sum of a finite number of linear fractional functions over a polyhedral region. Firstly, the equivalence problem (EP) of the LFP problem is given by a new
Bo Zhang, Yuelin Gao, Xia Liu, Xiaoli Huang   +3 more
semanticscholar   +1 more source

A parametric approach to integer linear fractional programming: Newton's and Hybrid-Newton methods for an optimal road maintenance problem

European Journal of Operational Research, 2021
In this paper we study a parametric approach, one of the resolution methods for solving integer linear fractional programming (ILFP) problems in which all functions in the objective and constraints are linear and all variables are integers.
Chong Hyun Park, Heejong Lim
semanticscholar   +1 more source

Multiple Objective Linear Fractional Programming

Management Science, 1981
This paper presents a simplex-based solution procedure for the multiple objective linear fractional programming problem. By (1) departing slightly from the traditional notion of efficiency and (2) augmenting the feasible region as in goal programming, the solution procedure solves for all weakly efficient vertices of the augmented feasible region. The
Jonathan S. H. Kornbluth, Ralph E. Steuer   +1 more
openaire   +1 more source

Solving linear fractional bilevel programs

Operations Research Letters, 2004
The authors give a geometrical characterization of the optimal solution to the linear fractional bilevel programming (LFBP) problem in terms of what is called a boundary feasible extreme point. It is assumed that the second level optimal solution sets are singletons. The results extend the characterization proved by \textit{Y. H. Liu} and \textit{S. M.
Calvete, Herminia I., Galé, Carmen
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On solving fuzzy linear fractional programming in material aspects

, 2020
In this paper a method is present solving fractional linear programming problems in fuzzy environment by ranging methods, where parameters are fuzzy numbers with uncertain coefficients in the objective function.
R. Srinivasan
semanticscholar   +1 more source