Steklov Regularization and Trajectory Methods for Univariate Global Optimization
Abstract
We introduce a new regularization technique, using what we refer to as the Steklov regularization function, and apply this technique to devise an algorithm that computes a global minimizer of univariate coercive functions. First, we show that the Steklov regularization convexifies a given univariate coercive function. Then, by using the regularization parameter as the independent variable, a trajectory is constructed on the surface generated by the Steklov function. For monic quartic polynomials, we prove that this trajectory does generate a global minimizer. In the process, we derive some properties of quartic polynomials. Comparisons are made with a previous approach which uses a quadratic regularization function. We carry out numerical experiments to illustrate the working of the new method on polynomials of various degree as well as a non-polynomial function.
Cite
@article{arxiv.1809.04530,
title = {Steklov Regularization and Trajectory Methods for Univariate Global Optimization},
author = {Orhan Arıkan and Regina S. Burachik and C. Yalçın Kaya},
journal= {arXiv preprint arXiv:1809.04530},
year = {2018}
}
Comments
31 pages, 5 figures