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Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. / Abbasov, M.E.; Demyanov, V.F.

Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. Springer Nature, 2013. p. 569-585.

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Harvard

Abbasov, ME & Demyanov, VF 2013, Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. in Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. Springer Nature, pp. 569-585. https://doi.org/10.1007/s10898-012-9873-8

APA

Abbasov, M. E., & Demyanov, V. F. (2013). Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. In Proper and adjoint exhausters in nonsmooth analysis: optimality conditions (pp. 569-585). Springer Nature. https://doi.org/10.1007/s10898-012-9873-8

Vancouver

Abbasov ME, Demyanov VF. Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. In Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. Springer Nature. 2013. p. 569-585 https://doi.org/10.1007/s10898-012-9873-8

Author

Abbasov, M.E. ; Demyanov, V.F. / Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. Proper and adjoint exhausters in nonsmooth analysis: optimality conditions. Springer Nature, 2013. pp. 569-585

BibTeX

@inproceedings{55b537a271ad4b2c8a369aeb1621fcbf,
title = "Proper and adjoint exhausters in nonsmooth analysis: optimality conditions",
abstract = "The notions of upper and lower exhausters represent generalizations of the notions of exhaustive families of upper convex and lower concave approximations (u.c.a., l.c.a.). The notions of u.c.a.{\textquoteright}s and l.c.a.{\textquoteright}s were introduced by Pshenichnyi (Convex Analysis and Extremal Problems, Series in Nonlinear Analysis and its Applications, 1980), while the notions of exhaustive families of u.c.a.{\textquoteright}s and l.c.a.{\textquoteright}s were described by Demyanov and Rubinov in Nonsmooth Problems of Optimization Theory and Control, Leningrad University Press, Leningrad, 1982. These notions allow one to solve the problem of optimization of an arbitrary function by means of Convex Analysis thus essentially extending the area of application of Convex Analysis. In terms of exhausters it is possible to describe extremality conditions, and it turns out that conditions for a minimum are expressed via an upper exhauster while conditions for a maximum are formulated in terms of a lower exhauster (Abbasov and Demyanov (2010), Demyanov and Roshchina (Appl",
keywords = "Nonsmooth analysis, Proper and adjoint exhausters and coexhausters, Extremality conditions, Converters",
author = "M.E. Abbasov and V.F. Demyanov",
year = "2013",
doi = "10.1007/s10898-012-9873-8",
language = "English",
isbn = "0925-5001",
pages = "569--585",
booktitle = "Proper and adjoint exhausters in nonsmooth analysis: optimality conditions",
publisher = "Springer Nature",
address = "Germany",

}

RIS

TY - GEN

T1 - Proper and adjoint exhausters in nonsmooth analysis: optimality conditions

AU - Abbasov, M.E.

AU - Demyanov, V.F.

PY - 2013

Y1 - 2013

N2 - The notions of upper and lower exhausters represent generalizations of the notions of exhaustive families of upper convex and lower concave approximations (u.c.a., l.c.a.). The notions of u.c.a.’s and l.c.a.’s were introduced by Pshenichnyi (Convex Analysis and Extremal Problems, Series in Nonlinear Analysis and its Applications, 1980), while the notions of exhaustive families of u.c.a.’s and l.c.a.’s were described by Demyanov and Rubinov in Nonsmooth Problems of Optimization Theory and Control, Leningrad University Press, Leningrad, 1982. These notions allow one to solve the problem of optimization of an arbitrary function by means of Convex Analysis thus essentially extending the area of application of Convex Analysis. In terms of exhausters it is possible to describe extremality conditions, and it turns out that conditions for a minimum are expressed via an upper exhauster while conditions for a maximum are formulated in terms of a lower exhauster (Abbasov and Demyanov (2010), Demyanov and Roshchina (Appl

AB - The notions of upper and lower exhausters represent generalizations of the notions of exhaustive families of upper convex and lower concave approximations (u.c.a., l.c.a.). The notions of u.c.a.’s and l.c.a.’s were introduced by Pshenichnyi (Convex Analysis and Extremal Problems, Series in Nonlinear Analysis and its Applications, 1980), while the notions of exhaustive families of u.c.a.’s and l.c.a.’s were described by Demyanov and Rubinov in Nonsmooth Problems of Optimization Theory and Control, Leningrad University Press, Leningrad, 1982. These notions allow one to solve the problem of optimization of an arbitrary function by means of Convex Analysis thus essentially extending the area of application of Convex Analysis. In terms of exhausters it is possible to describe extremality conditions, and it turns out that conditions for a minimum are expressed via an upper exhauster while conditions for a maximum are formulated in terms of a lower exhauster (Abbasov and Demyanov (2010), Demyanov and Roshchina (Appl

KW - Nonsmooth analysis

KW - Proper and adjoint exhausters and coexhausters

KW - Extremality conditions

KW - Converters

U2 - 10.1007/s10898-012-9873-8

DO - 10.1007/s10898-012-9873-8

M3 - Conference contribution

SN - 0925-5001

SP - 569

EP - 585

BT - Proper and adjoint exhausters in nonsmooth analysis: optimality conditions

PB - Springer Nature

ER -

ID: 7368605