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 |
Fingerprint
Keywords
- Nonlinear optimization
- Complexity theory
- High-order models
Cite this
Birgin, E., Gardenghi, J., Martinez, J-M., Santos, S. A., & Toint, P. (2015). Worst-case evaluation complexity for unconstrained nonlinear optimization using high-order regularized models. (naXys Technical Reports; Vol. 05-2015). 2015: Namur center for complex systems.