Convergence of Clipped SGD on Convex (L0,L1)-Smooth Functions

Abstract

We study stochastic gradient descent (SGD) with gradient clipping on convex functions under a generalized smoothness assumption called (L0,L1)-smoothness. Using gradient clipping, we establish a high probability convergence rate that matches the SGD rate in the L smooth case up to polylogarithmic factors and additive terms. We also propose a variation of adaptive SGD with gradient clipping, which achieves the same guarantee. We perform empirical experiments to examine our theory and algorithmic choices.

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