Stochastic regularized majorization-minimization with weakly convex and multi-convex surrogates

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Publication date: 5 January 2022

Abstract: Stochastic majorization-minimization (SMM) is a class of stochastic optimization algorithms that proceed by sampling new data points and minimizing a recursive average of surrogate functions of an objective function. The surrogates are required to be strongly convex and convergence rate analysis for the general non-convex setting was not available. In this paper, we propose an extension of SMM where surrogates are allowed to be only weakly convex or block multi-convex, and the averaged surrogates are approximately minimized with proximal regularization or block-minimized within diminishing radii, respectively. For the general nonconvex constrained setting with non-i.i.d. data samples, we show that the first-order optimality gap of the proposed algorithm decays at the rate

O ((l o g n)^{1 + e p s i l o n} / n^{1 / 2})

for the empirical loss and

O ((l o g n)^{1 + e p s i l o n} / n^{1 / 4})

for the expected loss, where

n

denotes the number of data samples processed. Under some additional assumption, the latter convergence rate can be improved to

O ((l o g n)^{1 + e p s i l o n} / n^{1 / 2})

. As a corollary, we obtain the first convergence rate bounds for various optimization methods under general nonconvex dependent data setting: Double-averaging projected gradient descent and its generalizations, proximal point empirical risk minimization, and online matrix/tensor decomposition algorithms. We also provide experimental validation of our results.

Has companion code repository: https://github.com/HanbaekLyu/SRMM

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