Worst-case evaluation complexity for unconstrained nonlinear optimization using high-order regularized models

Ernesto Birgin; John Gardenghi; José-Mario Martinez; Sandra Augusta Santos; Philippe Toint

Worst-case evaluation complexity for unconstrained nonlinear optimization using high-order regularized models

Ernesto Birgin, John Gardenghi, José-Mario Martinez, Sandra Augusta Santos, Philippe Toint

Namur Institute for Complex Systems

Research output: Working paper

36 Downloads (Pure)

Abstract

The worst-case evaluation complexity for smooth (possibly nonconvex) unconstrained optimization is considered. It is shown that, if one is willing to use derivatives of the objective function up to order $p$ (for $p\geq 1$) and to assume Lipschitz continuity of the $p$-th derivative, then an $\epsilon$-approximate first-order critical point can be computed in at most $O(\epsilon^{-(p+1)/p})$ evaluations of the problem's objective function and its derivatives. This generalizes and subsumes results known for $p=1$ and $p=2$.

Original language	English
Place of Publication	2015
Publisher	Namur center for complex systems
Number of pages	8
Volume	naXys-05-2015
Publication status	Published - Jun 2015

Publication series

Name	naXys Technical Reports
Publisher	naXys
Volume	05-2015

Keywords

Nonlinear optimization
Complexity theory
High-order models

Access to Document

NTR-05-2015Submitted manuscript, 872 KB

17 Article
2 Working paper
1 Book
1 Other report
More
- 1 Chapter

Evaluation complexity of algorithms for nonconvex optimization
Cartis, C., Gould, N. I. M. & TOINT, P., Jul 2022, SIAM. 600 p. (SIAM-MOS Series on Optimization)
Research output: Book/Report/Journal › Book
Adaptive regularization algorithms with inexact evaluations for nonconvex optimization
Bellavia, S., Gurioli, G., Morini, B. & Toint, P., 2 Jan 2020, In: SIAM Journal on Optimization. 29, 4, p. 2881-2915 35 p.
Research output: Contribution to journal › Article › peer-review

Open Access
File
28 Downloads (Pure)
Complexity of partially separable convexly constrained optimization with non-Lipschitzian singularities
Chen, X., Toint, P. & Wang, H., 15 Apr 2019, In: SIAM Journal on Optimization. 29, 1, p. 874-903 30 p.
Research output: Contribution to journal › Article › peer-review

Open Access
File
26 Downloads (Pure)

2 Active

Complexity in nonlinear optimization
TOINT, P., Gould, N. I. M. & Cartis, C.
1/11/08 → …
Project: Research
ADALGOPT: ADALGOPT - Advanced algorithms in nonlinear optimization
Sartenaer, A. & TOINT, P.
1/01/87 → …
Project: Research Axis

4 Invited talk
4 Oral presentation
1 Research/Teaching in a external institution
1 Visiting an external academic institution

A path and some adventures in the jungle of high-order nonlinear optimization
Philippe Toint (Speaker)
24 Oct 2017
Activity: Talk or presentation types › Invited talk
A path and some adventures in the jungle of high-order nonlinear optimization
Philippe Toint (Speaker)
23 Oct 2017
Activity: Talk or presentation types › Invited talk
High-order optimality conditions in nonlinear optimization: necessary conditions and a conceptual approach of evaluation complexity
Philippe Toint (Speaker)
10 Aug 2016
Activity: Talk or presentation types › Invited talk

Cite this

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title = "Worst-case evaluation complexity for unconstrained nonlinear optimization using high-order regularized models",

abstract = "The worst-case evaluation complexity for smooth (possibly nonconvex) unconstrained optimization is considered. It is shown that, if one is willing to use derivatives of the objective function up to order $p$ (for $p\geq 1$) and to assume Lipschitz continuity of the $p$-th derivative, then an $\epsilon$-approximate first-order critical point can be computed in at most $O(\epsilon^{-(p+1)/p})$ evaluations of the problem's objective function and its derivatives. This generalizes and subsumes results known for $p=1$ and $p=2$.",

keywords = "Nonlinear optimization, Complexity theory, High-order models",

author = "Ernesto Birgin and John Gardenghi and Jos{\'e}-Mario Martinez and Santos, {Sandra Augusta} and Philippe Toint",

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AU - Birgin, Ernesto

AU - Gardenghi, John

AU - Martinez, José-Mario

AU - Santos, Sandra Augusta

AU - Toint, Philippe

PY - 2015/6

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N2 - The worst-case evaluation complexity for smooth (possibly nonconvex) unconstrained optimization is considered. It is shown that, if one is willing to use derivatives of the objective function up to order $p$ (for $p\geq 1$) and to assume Lipschitz continuity of the $p$-th derivative, then an $\epsilon$-approximate first-order critical point can be computed in at most $O(\epsilon^{-(p+1)/p})$ evaluations of the problem's objective function and its derivatives. This generalizes and subsumes results known for $p=1$ and $p=2$.

AB - The worst-case evaluation complexity for smooth (possibly nonconvex) unconstrained optimization is considered. It is shown that, if one is willing to use derivatives of the objective function up to order $p$ (for $p\geq 1$) and to assume Lipschitz continuity of the $p$-th derivative, then an $\epsilon$-approximate first-order critical point can be computed in at most $O(\epsilon^{-(p+1)/p})$ evaluations of the problem's objective function and its derivatives. This generalizes and subsumes results known for $p=1$ and $p=2$.

KW - Nonlinear optimization

KW - Complexity theory

KW - High-order models

M3 - Working paper

VL - naXys-05-2015

T3 - naXys Technical Reports

BT - Worst-case evaluation complexity for unconstrained nonlinear optimization using high-order regularized models

PB - Namur center for complex systems

CY - 2015

ER -

Worst-case evaluation complexity for unconstrained nonlinear optimization using high-order regularized models

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