Non-Univalent Approximation of Peano Curve for Global Optimization

Daniela Lera
First
;
2023-01-01

Abstract

In this article, multi-dimensional global optimization problems are considered, where the objective function is supposed to be Lipschitz continuous, multiextremal and without a known analytic expression (black-box). Non-Univalent approximation of Peano curve to reduce the problem to a univariate one satisfying the Hölder condition is employed. Geometric frameworks for construction of global optimization algorithms are discussed. Numerical experiments executed on 100 test functions taken from the literature show a promising performance of the algorithms.
2023
Inglese
International Conference of Numerical Analysis and Applied Mathematics. ICNAAM 2021
American Institute of Physics
Giovanna Califano, et al.
Theodore Simos, Charalambos Tsitouras
AIP CONFERENCE PROCEEDINGS
2849
1
4
2-s2.0-85176731853
https://pubs.aip.org/aip/acp/issue/2849/1
International Conference of Numerical Analysis and Applied Mathematics 2021, ICNAAM 2021
Esperti anonimi
20-26 Settembre 2021
Rhodes, Grecia
internazionale
scientifica
4 Contributo in Atti di Convegno (Proceeding)::4.1 Contributo in Atti di convegno
Lera, Daniela; Chiara Nasso, Maria; Sergeyev, Yaroslav D.
273
3
4.1 Contributo in Atti di convegno
partially_open
info:eu-repo/semantics/conferencePaper
Files in This Item:
File Size Format  
AIP Lera Nasso Sergeyev published.pdf

Solo gestori archivio

Description: File pdf
Type: versione editoriale
Size 1.82 MB
Format Adobe PDF
& nbsp; View / Open   Request a copy
1.82 MB Adobe PDF & nbsp; View / Open   Request a copy
Non-Univalent Approximation of Peano Curve for Global Optimization.pdf

open access

Type: versione post-print
Size 1.24 MB
Format Adobe PDF
View/Open
1.24 MB Adobe PDF View/Open

Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.

Questionnaire and social

Share on:
Impostazioni cookie