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On the Convergence of Stochastic Gradient Descent for Nonlinear Ill-Posed Problems

Bangti Jin, Zehui Zhou, Jun Zou

2020SIAM Journal on Optimization43 citationsDOI

Abstract

In this work, we analyze the regularizing property of the stochastic gradient descent for the numerical solution of a class of nonlinear ill-posed inverse problems in Hilbert spaces. At each step of the iteration, the method randomly chooses one equation from the nonlinear system to obtain an unbiased stochastic estimate of the gradient and then performs a descent step with the estimated gradient. It is a randomized version of the classical Landweber method for nonlinear inverse problems, and it is highly scalable to the problem size and holds significant potential for solving large-scale inverse problems. Under the canonical tangential cone condition, we prove the regularizing property for a priori stopping rules and then establish the convergence rates under a suitable sourcewise condition and a range invariance condition.

Topics & Concepts

MathematicsStochastic gradient descentApplied mathematicsNonlinear systemGradient descentInverse problemConvergence (economics)Well-posed problemNonlinear conjugate gradient methodGradient methodA priori and a posterioriInverseMathematical optimizationMathematical analysisArtificial neural networkComputer scienceEconomicsPhysicsGeometryPhilosophyEconomic growthMachine learningQuantum mechanicsEpistemologyNumerical methods in inverse problemsGeochemistry and Geologic MappingStatistical Methods and Inference