Standard

Exact penalty functions method for solving problems of nondifferentiable optimization. / Polyakova, Lyudmila; Karelin, Vladimir.

в: Cybernetics and Physics, Том 3, № 3, 2014, стр. 124-129.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Polyakova, L & Karelin, V 2014, 'Exact penalty functions method for solving problems of nondifferentiable optimization.', Cybernetics and Physics, Том. 3, № 3, стр. 124-129. <http://lib.physcon.ru/doc?id=e6125a9de418>

APA

Polyakova, L., & Karelin, V. (2014). Exact penalty functions method for solving problems of nondifferentiable optimization. Cybernetics and Physics, 3(3), 124-129. http://lib.physcon.ru/doc?id=e6125a9de418

Vancouver

Polyakova L, Karelin V. Exact penalty functions method for solving problems of nondifferentiable optimization. Cybernetics and Physics. 2014;3(3):124-129.

Author

Polyakova, Lyudmila ; Karelin, Vladimir. / Exact penalty functions method for solving problems of nondifferentiable optimization. в: Cybernetics and Physics. 2014 ; Том 3, № 3. стр. 124-129.

BibTeX

@article{e45c13bde7f842b791c535c920184096,
title = "Exact penalty functions method for solving problems of nondifferentiable optimization.",
abstract = "In the article a method of exact penalty functions for minimizing a quasidifferentiable function under quasidifferentiable constraints is discusses. A regularity condition for the function which defines a constraint is introduced and prove that when it is running, there is an exact penalty parameter. The case when the constraint is convex is studied in detail.",
author = "Lyudmila Polyakova and Vladimir Karelin",
year = "2014",
language = "English",
volume = "3",
pages = "124--129",
journal = "Cybernetics and Physics",
issn = "2223-7038",
publisher = "IPACS",
number = "3",

}

RIS

TY - JOUR

T1 - Exact penalty functions method for solving problems of nondifferentiable optimization.

AU - Polyakova, Lyudmila

AU - Karelin, Vladimir

PY - 2014

Y1 - 2014

N2 - In the article a method of exact penalty functions for minimizing a quasidifferentiable function under quasidifferentiable constraints is discusses. A regularity condition for the function which defines a constraint is introduced and prove that when it is running, there is an exact penalty parameter. The case when the constraint is convex is studied in detail.

AB - In the article a method of exact penalty functions for minimizing a quasidifferentiable function under quasidifferentiable constraints is discusses. A regularity condition for the function which defines a constraint is introduced and prove that when it is running, there is an exact penalty parameter. The case when the constraint is convex is studied in detail.

M3 - Article

VL - 3

SP - 124

EP - 129

JO - Cybernetics and Physics

JF - Cybernetics and Physics

SN - 2223-7038

IS - 3

ER -

ID: 5757514