An Adaptive Trust-Region Method for Generalized Eigenvalues of Symmetric Tensors

Authors

Yuting Chen
Mingyuan Cao School of Mathematics and Statistics, Beihua University, Jilin 132013, China
Yueting Yang School of Mathematics and Statistics, Beihua University, Jilin 132013, China
Qingdao Huang School of Mathematics, Jilin University, Changchun 130012, China

DOI:

https://doi.org/10.4208/jcm.2001-m2019-0017

Keywords:

Symmetric tensors, Generalized eigenvalues, Trust-region, Global convergence, Local quadratic convergence.

Abstract

For symmetric tensors, computing generalized eigenvalues is equivalent to a homogenous polynomial optimization over the unit sphere. In this paper, we present an adaptive trust-region method for generalized eigenvalues of symmetric tensors. One of the features is that the trust-region radius is automatically updated by the adaptive technique to improve the algorithm performance. The other one is that a projection scheme is used to ensure the feasibility of all iteratives. Global convergence and local quadratic convergence of our algorithm are established, respectively. The preliminary numerical results show the efficiency of the proposed algorithm.

Downloads

Published

2021-04-07

Issue

Vol. 39 No. 3 (2021)

Section

Articles