Riemannian preconditioned coordinate descent for low multi-linear rank approximation
Optimization and Control
2024-03-22 v2
Abstract
This paper presents a memory efficient, first-order method for low multi-linear rank approximation of high-order, high-dimensional tensors. In our method, we exploit the second-order information of the cost function and the constraints to suggest a new Riemannian metric on the Grassmann manifold. We use a Riemmanian coordinate descent method for solving the problem, and also provide a global convergence analysis matching that of the coordinate descent method in the Euclidean setting. We also show that each step of our method with the unit step-size is actually a step of the orthogonal iteration algorithm. Experimental results show the computational advantage of our method for high-dimensional tensors.
Keywords
Cite
@article{arxiv.2109.01632,
title = {Riemannian preconditioned coordinate descent for low multi-linear rank approximation},
author = {Mohammad Hamed and Reshad Hosseini},
journal= {arXiv preprint arXiv:2109.01632},
year = {2024}
}
Comments
22 pages, 3 figures