Gradient descent on infinitely wide neural networks: global convergence and generalization
Francis Bach, Lénaïc Chizat
Abstract
Many supervised machine learning methods are naturally cast as optimization problems. For prediction models which are linear in their parameters, this often leads to convex problems for which many mathematical guarantees exist. Models which are nonlinear in their parameters such as neural networks lead to nonconvex optimization problems for which guarantees are harder to obtain. In this paper, we consider two-layer neural networks with homogeneous activation functions where the number of hidden neurons tends to infinity, and show how qualitative convergence guarantees may be derived.
Topics & Concepts
Artificial neural networkGeneralizationConvergence (economics)Gradient descentNonlinear systemInfinityMathematical optimizationComputer scienceRegular polygonHomogeneousMathematicsOptimization problemApplied mathematicsArtificial intelligenceMathematical analysisCombinatoricsGeometryQuantum mechanicsEconomicsEconomic growthPhysicsStochastic Gradient Optimization TechniquesNeural Networks and ApplicationsMachine Learning and ELM