Fréchet Discrete Gradient and Hessian Operators on Infinite-Dimensional Spaces

Alessio Moreschini; Gökhan Göksu; Thomas Parisini

doi:10.1016/j.ifacol.2024.07.067

Fréchet Discrete Gradient and Hessian Operators on Infinite-Dimensional Spaces

Alessio Moreschini
, Gökhan Göksu
, Thomas Parisini

Imperial College London
Yildiz Technical University
KIOS Research and Innovation Center of Excellence
University of Trieste

Araştırma sonucu: Dergiye katkı › Konferans makalesi › bilirkişi

4 Atıf (Scopus)

Özet

Benefiting from the notion of Fréchet derivatives, we define Fréchet discrete operators, such as gradient and Hessian, on infinite-dimensional spaces. The Fréchet discrete gradient expands upon the concept of the discrete gradient of Gonzalez (1996) for finite-dimensional spaces. The Fréchet discrete Hessian elevates the property to second-order representations of the Fréchet derivative. By leveraging these operators, we offer an initial exploration of discrete gradient methods for convex optimization in infinite-dimensional spaces. Under mild conditions on the objective functional, we establish the convergence of any sequence generated by the proposed Fréchet discrete gradient method, regardless of the choice of the finite learning rate.

Orijinal dil	İngilizce
Sayfa (başlangıç-bitiş)	78-83
Sayfa sayısı	6
Dergi	IFAC-PapersOnLine
Hacim	58
Basın numarası	5
DOI'lar	https://doi.org/10.1016/j.ifacol.2024.07.067
Yayın durumu	Yayınlandı - 1 Haz 2024
Harici olarak yayınlandı	Evet
Etkinlik	7th IFAC Conference on Analysis and Control of Nonlinear Dynamics and Chaos, ACNDC 2024 - London, United Kingdom Süre: 5 Haz 2024 → 7 Haz 2024

Bibliyografik not

Publisher Copyright:
Copyright © 2024 The Authors.

Belgeye Erişim

10.1016/j.ifacol.2024.07.067

Diğer Dosyalar ve Linkler

Link to publication in Scopus

Alıntı Yap

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title = "Fr{\'e}chet Discrete Gradient and Hessian Operators on Infinite-Dimensional Spaces",

abstract = "Benefiting from the notion of Fr{\'e}chet derivatives, we define Fr{\'e}chet discrete operators, such as gradient and Hessian, on infinite-dimensional spaces. The Fr{\'e}chet discrete gradient expands upon the concept of the discrete gradient of Gonzalez (1996) for finite-dimensional spaces. The Fr{\'e}chet discrete Hessian elevates the property to second-order representations of the Fr{\'e}chet derivative. By leveraging these operators, we offer an initial exploration of discrete gradient methods for convex optimization in infinite-dimensional spaces. Under mild conditions on the objective functional, we establish the convergence of any sequence generated by the proposed Fr{\'e}chet discrete gradient method, regardless of the choice of the finite learning rate.",

keywords = "Discrete gradients, Fr{\'e}chet derivative, Geometric integration on Banach spaces, Infinite-dimensional convex optimization, Infinite-dimensional spaces, Structural preservation",

author = "Alessio Moreschini and G{\"o}khan G{\"o}ksu and Thomas Parisini",

note = "Publisher Copyright: Copyright {\textcopyright} 2024 The Authors.; 7th IFAC Conference on Analysis and Control of Nonlinear Dynamics and Chaos, ACNDC 2024 ; Conference date: 05-06-2024 Through 07-06-2024",

year = "2024",

month = jun,

day = "1",

doi = "10.1016/j.ifacol.2024.07.067",

language = "English",

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pages = "78--83",

journal = "IFAC-PapersOnLine",

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TY - JOUR

T1 - Fréchet Discrete Gradient and Hessian Operators on Infinite-Dimensional Spaces

AU - Moreschini, Alessio

AU - Göksu, Gökhan

AU - Parisini, Thomas

PY - 2024/6/1

Y1 - 2024/6/1

N2 - Benefiting from the notion of Fréchet derivatives, we define Fréchet discrete operators, such as gradient and Hessian, on infinite-dimensional spaces. The Fréchet discrete gradient expands upon the concept of the discrete gradient of Gonzalez (1996) for finite-dimensional spaces. The Fréchet discrete Hessian elevates the property to second-order representations of the Fréchet derivative. By leveraging these operators, we offer an initial exploration of discrete gradient methods for convex optimization in infinite-dimensional spaces. Under mild conditions on the objective functional, we establish the convergence of any sequence generated by the proposed Fréchet discrete gradient method, regardless of the choice of the finite learning rate.

AB - Benefiting from the notion of Fréchet derivatives, we define Fréchet discrete operators, such as gradient and Hessian, on infinite-dimensional spaces. The Fréchet discrete gradient expands upon the concept of the discrete gradient of Gonzalez (1996) for finite-dimensional spaces. The Fréchet discrete Hessian elevates the property to second-order representations of the Fréchet derivative. By leveraging these operators, we offer an initial exploration of discrete gradient methods for convex optimization in infinite-dimensional spaces. Under mild conditions on the objective functional, we establish the convergence of any sequence generated by the proposed Fréchet discrete gradient method, regardless of the choice of the finite learning rate.

KW - Discrete gradients

KW - Fréchet derivative

KW - Geometric integration on Banach spaces

KW - Infinite-dimensional convex optimization

KW - Infinite-dimensional spaces

KW - Structural preservation

UR - https://www.scopus.com/pages/publications/85202153080

U2 - 10.1016/j.ifacol.2024.07.067

DO - 10.1016/j.ifacol.2024.07.067

M3 - Conference article

AN - SCOPUS:85202153080

SN - 2405-8963

VL - 58

SP - 78

EP - 83

JO - IFAC-PapersOnLine

JF - IFAC-PapersOnLine

IS - 5

T2 - 7th IFAC Conference on Analysis and Control of Nonlinear Dynamics and Chaos, ACNDC 2024

Y2 - 5 June 2024 through 7 June 2024

ER -

Fréchet Discrete Gradient and Hessian Operators on Infinite-Dimensional Spaces

Özet

Bibliyografik not

Belgeye Erişim

Diğer Dosyalar ve Linkler

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