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Non-convergence of stochastic gradient descent in the training of deep neural networks

Patrick Cheridito, Arnulf Jentzen, Florian Rossmannek

2021Repository for Publications and Research Data (ETH Zurich)37 citationsDOIOpen Access PDF

Abstract

Deep neural networks have successfully been trained in various application areas with stochastic gradient descent. However, there exists no rigorous mathematical explanation why this works so well. The training of neural networks with stochastic gradient descent has four different discretization parameters: (i) the network architecture; (ii) the amount of training data; (iii) the number of gradient steps; and (iv) the number of randomly initialized gradient trajectories. While it can be shown that the approximation error converges to zero if all four parameters are sent to infinity in the right order, we demonstrate in this paper that stochastic gradient descent fails to converge for ReLU networks if their depth is much larger than their width and the number of random initializations does not increase to infinity fast enough.

Topics & Concepts

Stochastic gradient descentGradient descentArtificial neural networkInfinityMathematicsConvergence (economics)DiscretizationStochastic neural networkApplied mathematicsMathematical optimizationComputer scienceArtificial intelligenceMathematical analysisRecurrent neural networkEconomic growthEconomicsStochastic Gradient Optimization TechniquesMachine Learning and ELMAdvanced Neural Network Applications
Non-convergence of stochastic gradient descent in the training of deep neural networks | Litcius