Paper Info
Title
Homotopy Analysis for Tensor PCA.
Abstract
Author(s): Anandkumar, A; Deng, Y; Ge, R; Mobahi, H | Abstract: Developing efficient and guaranteed nonconvex algorithms has been an important challenge in modern machine learning. Algorithms with good empirical performance such as stochastic gradient descent often lack theoretical guarantees. In this paper, we analyze the class of homotopy or continuation methods for global optimization of nonconvex functions. These methods start from an objective function that is efficient to optimize (e.g. convex), and progressively modify it to obtain the required objective, and the solutions are passed along the homotopy path. For the challenging problem of tensor PCA, we prove global convergence of the homotopy method in the high regime. The signal-to-noise requirement for our algorithm is tight in the sense that it matches the recovery guarantee for the best degree-4 sum-of-squares algorithm. In addition, we prove a phase transition along the homotopy path for tensor PCA. This allows to simplify the homotopy method to a local search algorithm, viz., tensor power iterations, with a specific initialization and a noise injection procedure, while retaining the theoretical guarantees.
Year
Venue
Field
2017
COLT
Convergence (routing),Mathematical optimization,Stochastic gradient descent,Tensor,Global optimization,Artificial intelligence,Local search (optimization),Homotopy,Initialization,Homotopy analysis method,Machine learning,Mathematics
DocType
Citations 
PageRank 
Conference
4
0.43
References 
Authors
12
4
Name
Order
Citations
PageRank
Animashree Anandkumar11629116.30
Yuan Deng22511.91
Rong Ge3162676.01
Hossein Mobahi438226.89