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First-Order Methods for Nonconvex Quadratic Minimization

Yair Carmon, John C. Duchi

2020SIAM Review19 citationsDOIOpen Access PDF

Abstract

We consider minimization of indefinite quadratics with either trust-region (norm) constraints or cubic regularization. Despite the nonconvexity of these problems we prove that, under mild assumptions, gradient descent converges to their global solutions, and give a non-asymptotic rate of convergence for the cubic variant. We also consider Krylov subspace solutions and establish sharp convergence guarantees to the solutions of both trust-region and cubic-regularized problems. Our rates mirror the behavior of these methods on convex quadratics and eigenvector problems, highlighting their scalability. When we use Krylov subspace solutions to approximate the cubic-regularized Newton step, our results recover the strongest known convergence guarantees to approximate second-order stationary points of general smooth nonconvex functions.

Topics & Concepts

MathematicsKrylov subspaceRate of convergenceQuadratic equationConvergence (economics)Subspace topologyApplied mathematicsMinificationEigenvalues and eigenvectorsRegular polygonMathematical optimizationStationary pointDescent (aeronautics)Gradient descentConvex functionConvex optimizationLocal convergenceNewton's methodDescent directionIterative methodModes of convergence (annotated index)Stochastic Gradient Optimization TechniquesAdvanced Optimization Algorithms ResearchSparse and Compressive Sensing Techniques
First-Order Methods for Nonconvex Quadratic Minimization | Litcius