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 stochastic three-composite convex minimization


Stochastic Three-Composite Convex Minimization

Neural Information Processing Systems

We propose a stochastic optimization method for the minimization of the sum of three convex functions, one of which has Lipschitz continuous gradient as well as restricted strong convexity. Our approach is most suitable in the setting where it is computationally advantageous to process smooth term in the decomposition with its stochastic gradient estimate and the other two functions separately with their proximal operators, such as doubly regularized empirical risk minimization problems. We prove the convergence characterization of the proposed algorithm in expectation under the standard assumptions for the stochastic gradient estimate of the smooth term. Our method operates in the primal space and can be considered as a stochastic extension of the three-operator splitting method. Finally, numerical evidence supports the effectiveness of our method in real-world problems.


Reviews: Stochastic Three-Composite Convex Minimization

Neural Information Processing Systems

In this paper the authors proposed a stochastic optimization algorithm, STCM, for a three composite convex minimization problems. This problem can be write the sum of two proper, lower semicontinuous convex functions and a smooth function with restricted strong convexity. This work is based on the deterministic three operator splitting method proposed by Davis and Yin. The almost surely convergence and a convergence rate are established. Major comments: (1) The main result is quite clear, but lacks the support in details for important aspects. For example, it would be better to show some intuition of the proposed algorithm.


Stochastic Three-Composite Convex Minimization

Neural Information Processing Systems

We propose a stochastic optimization method for the minimization of the sum of three convex functions, one of which has Lipschitz continuous gradient as well as restricted strong convexity. Our approach is most suitable in the setting where it is computationally advantageous to process smooth term in the decomposition with its stochastic gradient estimate and the other two functions separately with their proximal operators, such as doubly regularized empirical risk minimization problems. We prove the convergence characterization of the proposed algorithm in expectation under the standard assumptions for the stochastic gradient estimate of the smooth term. Our method operates in the primal space and can be considered as a stochastic extension of the three-operator splitting method. Finally, numerical evidence supports the effectiveness of our method in real-world problems.