Related papers: Explicit Regularization of Stochastic Gradient Methods through Duality

Explicit Regularization of Stochastic Gradient Methods through Duality

URL: http://arxiv.org/abs/2003.13807v1
Date: Mon, 30 Mar 2020 20:44:56 GMT
Title: Explicit Regularization of Stochastic Gradient Methods through Duality
Authors: Anant Raj and Francis Bach
Abstract summary: We propose randomized Dykstra-style algorithms based on randomized dual coordinate ascent. For accelerated coordinate descent, we obtain a new algorithm that has better convergence properties than existing gradient methods in the interpolating regime.
Score: 9.131027490864938
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We consider stochastic gradient methods under the interpolation regime where a perfect fit can be obtained (minimum loss at each observation). While previous work highlighted the implicit regularization of such algorithms, we consider an explicit regularization framework as a minimum Bregman divergence convex feasibility problem. Using convex duality, we propose randomized Dykstra-style algorithms based on randomized dual coordinate ascent. For non-accelerated coordinate descent, we obtain an algorithm which bears strong similarities with (non-averaged) stochastic mirror descent on specific functions, as it is is equivalent for quadratic objectives, and equivalent in the early iterations for more general objectives. It comes with the benefit of an explicit convergence theorem to a minimum norm solution. For accelerated coordinate descent, we obtain a new algorithm that has better convergence properties than existing stochastic gradient methods in the interpolating regime. This leads to accelerated versions of the perceptron for generic $\ell_p$-norm regularizers, which we illustrate in experiments.

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