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A Deep Neural Network Algorithm for Semilinear Elliptic PDEs with Applications in Insurance Mathematics

Stefan Kremsner

2020MDPI (MDPI AG)25 citationsDOIOpen Access PDF

Abstract

In insurance mathematics, optimal control problems over an infinite time horizon arise when computing risk measures. An example of such a risk measure is the expected discounted future dividend payments. In models which take multiple economic factors into account, this problem is high-dimensional. The solutions to such control problems correspond to solutions of deterministic semilinear (degenerate) elliptic partial differential equations. In the present paper we propose a novel deep neural network algorithm for solving such partial differential equations in high dimensions in order to be able to compute the proposed risk measure in a complex high-dimensional economic environment. The method is based on the correspondence of elliptic partial differential equations to backward stochastic differential equations with unbounded random terminal time. In particular, backward stochastic differential equations—which can be identified with solutions of elliptic partial differential equations—are approximated by means of deep neural networks.

Topics & Concepts

Elliptic partial differential equationMathematicsStochastic partial differential equationPartial differential equationNumerical partial differential equationsArtificial neural networkApplied mathematicsMeasure (data warehouse)Stochastic differential equationDegenerate energy levelsComputer scienceMathematical analysisPhysicsMachine learningDatabaseQuantum mechanicsModel Reduction and Neural NetworksStochastic processes and financial applicationsProbabilistic and Robust Engineering Design
A Deep Neural Network Algorithm for Semilinear Elliptic PDEs with Applications in Insurance Mathematics | Litcius