Exploiting the Structure via Sketched Gradient Algorithms
Abstract
Sketched gradient algorithms have been recently introduced for efficiently solving the large-scale constrained Least-squares regressions. In this paper we provide novel convergence analysis for the basic method {\it Gradient Projection Classical Sketch} (GPCS) to reveal the fast linear convergence rate of GPCS towards a vicinity of the solution thanks to the intrinsic low-dimensional geometric structure of the solution prompted by constraint set. Similar to our analysis we observe computational and sketch size trade-offs in numerical experiments. Hence we justify that the combination of gradient methods and the sketching technique is a way of designing efficient algorithms which can actively exploit the low-dimensional structure to accelerate computation in large scale data regression and signal processing applications.
Cite
@article{arxiv.1705.05348,
title = {Exploiting the Structure via Sketched Gradient Algorithms},
author = {Junqi Tang and Mohammad Golbabaee and Mike Davies},
journal= {arXiv preprint arXiv:1705.05348},
year = {2017}
}
Comments
7 pages