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SHARP: a hybrid metaheuristic approach for intelligent robotic path planning. [PDF]
Sci RepFakhouri H +7 more
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A feasible direction method for image restoration
Optimization Letters, 2011zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Elena Loli Piccolomini
exaly +3 more sources
Feasible direction methods for stochastic programming problems
Mathematical Programming, 1980A unified approach to stochastic feasible direction methods is developed. An abstract point-to-set map description of the algorithm is used and a general convergence theorem is proved. The theory is used to develop stochastic analogs of classical feasible direction algorithms.
Andrzej Ruszczynski +1 more
exaly +3 more sources
A stochastic approximation counterpart of the feasible direction method
Statistics and Probability Letters, 1987A stochastic approximation counterpart of the feasible direction method of Topkis and Veinott is considered. No convexity condition on a function to be minimized is imposed and a procedure for one-dimensional minimization along each feasible direction chosen is included.
Jacek Koronacki
exaly +2 more sources
Generalized reduced gradient method as an extension of feasible direction methods
Journal of Optimization Theory and Applications, 1977The paper presents modifications of the generalized reduced gradient method which allows for a convergence proof. For that, a special construction of the basis is introduced, and some tools of the theory of feasible direction are used to modify the common choice of the direction at every step.
Y Smeers
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The regularized feasible directions method for nonconvex optimization
Operations Research Letters, 2022zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Amir Beck, Nadav Hallak
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Probabilistic version of the method of feasible directions
Applied Mathematics and Computation, 2002This paper is a sequel of the results obtained by one of the authors [see \textit{J. Korychki} and \textit{M. Kostreva}, J. Optimization Theory 92, 311--330 (1994; Zbl 0886.90128) and 91, 389--418 (1996; Zbl 0883.90101)]. It is devoted to the discussion of random procedure that implements the solution of the non linear programming inequality ...
Artur Gorka, Michael M. Kostreva
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A superlinearly convergent method of feasible directions
Applied Mathematics and Computation, 2000zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Michael M. Kostreva, X. Chen
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