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Adaptive Integration of Nonlinear Evolution Equations on Tensor Manifolds

Abram Rodgers, Alec Dektor, Daniele Venturi

2022Journal of Scientific Computing17 citationsDOIOpen Access PDF

Abstract

Abstract We develop new adaptive algorithms for temporal integration of nonlinear evolution equations on tensor manifolds. These algorithms, which we call step-truncation methods, are based on performing one time step with a conventional time-stepping scheme, followed by a truncation operation onto a tensor manifold. By selecting the rank of the tensor manifold adaptively to satisfy stability and accuracy requirements, we prove convergence of a wide range of step-truncation methods, including explicit one-step and multi-step methods. These methods are very easy to implement as they rely only on arithmetic operations between tensors, which can be performed by efficient and scalable parallel algorithms. Adaptive step-truncation methods can be used to compute numerical solutions of high-dimensional PDEs, which, have become central to many new areas of application such optimal mass transport, random dynamical systems, and mean field optimal control. Numerical applications are presented and discussed for a Fokker-Planck equation with spatially dependent drift on a flat torus of dimension two and four.

Topics & Concepts

MathematicsTruncation (statistics)Truncation errorManifold (fluid mechanics)Nonlinear systemTensor (intrinsic definition)Applied mathematicsConvergence (economics)Stability (learning theory)Dimension (graph theory)Mathematical optimizationMathematical analysisComputer scienceGeometryPure mathematicsEconomic growthEconomicsMachine learningQuantum mechanicsEngineeringMechanical engineeringPhysicsStatisticsTensor decomposition and applicationsModel Reduction and Neural NetworksNumerical methods for differential equations