An Introduction to Non-Smooth Convex Analysis via Multiplicative Derivative

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An introduction to non-smooth convex analysis via multiplicative derivative.pdf (1.03 MB)

Date

2019

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Publisher

Taylor & Francis Ltd

Open Access Color

GOLD

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Yes

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60

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139

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Abstract

In this study, *-directional derivative and *-subgradient are defined using the multiplicative derivative, making a new contribution to non-Newtonian calculus for use in non-smooth analysis. As for directional derivative and subgradient, which are used in the non-smooth optimization theory, basic definitions and preliminary facts related to optimization theory are stated and proved, and the *-subgradient concept is illustrated by providing some examples, such as absolute value and exponential functions. In addition, necessary and sufficient optimality conditions are obtained for convex problems.

Description

Tor, Ali Hakan/0000-0003-3193-5004;
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Tor, Ali Hakan ORCID logo

Keywords

Optimality Conditions, Non-Smooth Convex Analysis, Multiplicative Calculus, Convex Analysis, Optimality conditions, Q1-390, optimality conditions, Science (General), multiplicative calculus, convex analysis, non-smooth convex analysis

Fields of Science

0211 other engineering and technologies, 02 engineering and technology

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Q1

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OpenCitations Citation Count
2

Source

Journal of Taibah University for Science

Volume

13

Issue

1

Start Page

351

End Page

359

URI

https://doi.org/10.1080/16583655.2019.1580122
 https://hdl.handle.net/20.500.12573/3262

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CrossRef : 2

Scopus : 2

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