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A robust second-order low-rank BUG integrator based on the midpoint rule

Gianluca Ceruti, Lukas Einkemmer, Jonas Kusch, Christian Lubich

2024BIT Numerical Mathematics20 citationsDOIOpen Access PDF

Abstract

Abstract Dynamical low-rank approximation has become a valuable tool to perform an on-the-fly model order reduction for prohibitively large matrix differential equations. A core ingredient is the construction of integrators that are robust to the presence of small singular values and the resulting large time derivatives of the orthogonal factors in the low-rank matrix representation. Recently, the robust basis-update & Galerkin (BUG) class of integrators has been introduced. These methods require no steps that evolve the solution backward in time, often have favourable structure-preserving properties, and allow for parallel time-updates of the low-rank factors. The BUG framework is flexible enough to allow for adaptations to these and further requirements. However, the BUG methods presented so far have only first-order robust error bounds. This work proposes a second-order BUG integrator for dynamical low-rank approximation based on the midpoint quadrature rule. The integrator first performs a half-step with a first-order BUG integrator, followed by a Galerkin update with a suitably augmented basis. We prove a robust second-order error bound which in addition shows an improved dependence on the normal component of the vector field. These rigorous results are illustrated and complemented by a number of numerical experiments.

Topics & Concepts

IntegratorRank (graph theory)MathematicsGalerkin methodBasis (linear algebra)Applied mathematicsMatrix (chemical analysis)MidpointRepresentation (politics)Robust principal component analysisComputer scienceAlgorithmMathematical optimizationFinite element methodGeometryPrincipal component analysisPhysicsCombinatoricsPolitical scienceLawPoliticsBandwidth (computing)Computer networkComposite materialMaterials scienceThermodynamicsStatisticsModel Reduction and Neural NetworksAdvanced Numerical Methods in Computational MathematicsElectromagnetic Simulation and Numerical Methods
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