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On the Derivation of Quasi-Newton Formulas for Optimization in Function Spaces

Radoslav Vuchkov, Cosmin G. Petra, Noémi Petra

2020Numerical Functional Analysis and Optimization14 citationsDOIOpen Access PDF

Abstract

Newton’s method is usually preferred when solving optimization problems due to its superior convergence properties compared to gradient-based or derivative-free optimization algorithms. However, deriving and computing second-order derivatives needed by Newton’s method often is not trivial and, in some cases, not possible. In such cases quasi-Newton algorithms are a great alternative. In this paper, we provide a new derivation of well-known quasi-Newton formulas in an infinite-dimensional Hilbert space setting. It is known that quasi-Newton update formulas are solutions to certain variational problems over the space of symmetric matrices. In this paper, we formulate similar variational problems over the space of bounded symmetric operators in Hilbert spaces. By changing the constraints of the variational problem we obtain updates (for the Hessian and Hessian inverse) not only for the Broyden-Fletcher-Goldfarb-Shanno (BFGS) quasi-Newton method but also for Davidon–Fletcher–Powell (DFP), Symmetric Rank One (SR1), and Powell-Symmetric-Broyden (PSB). In addition, for an inverse problem governed by a partial differential equation (PDE), we derive DFP and BFGS “structured” secant formulas that explicitly use the derivative of the regularization and only approximates the second derivative of the misfit term. We show numerical results that demonstrate the desired mesh-independence property and superior performance of the resulting quasi-Newton methods.

Topics & Concepts

Hessian matrixMathematicsQuasi-Newton methodNewton's methodBroyden–Fletcher–Goldfarb–Shanno algorithmApplied mathematicsHilbert spaceDirectional derivativeNewton's method in optimizationBounded functionMathematical analysisMathematical optimizationNonlinear systemIterative methodLocal convergenceComputer sciencePhysicsAsynchronous communicationQuantum mechanicsComputer networkAdvanced Optimization Algorithms ResearchIterative Methods for Nonlinear EquationsMatrix Theory and Algorithms