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Localized Model Reduction for Nonlinear Elliptic Partial Differential Equations: Localized Training, Partition of Unity, and Adaptive Enrichment

Kathrin Smetana, Tommaso Taddei

2023SIAM Journal on Scientific Computing22 citationsDOIOpen Access PDF

Abstract

We propose a component-based (CB) parametric model order reduction (pMOR) formulation for parameterized nonlinear elliptic partial differential equations (PDEs). CB-pMOR is designed to deal with large-scale problems for which full-order solves are not affordable in a reasonable time frame or parameters' variations induce topology changes that prevent the application of monolithic pMOR techniques. We rely on the partition-of-unity method (PUM) to devise global approximation spaces from local reduced spaces, and on Galerkin projection to compute the global state estimate. We propose a randomized data compression algorithm based on oversampling for the construction of the components' reduced spaces: the approach exploits random boundary conditions of controlled smoothness on the oversampling boundary. We further propose an adaptive residual-based enrichment algorithm that exploits global reduced-order solves on representative systems to update the local reduced spaces. We prove exponential convergence of the enrichment procedure for linear coercive problems; we further present numerical results for a two-dimensional nonlinear diffusion problem to illustrate the many features of our proposal and demonstrate its effectiveness.

Topics & Concepts

MathematicsPartition of unityNonlinear systemPartial differential equationProjection (relational algebra)Parameterized complexityReduction (mathematics)Elliptic partial differential equationModel order reductionApplied mathematicsDiscontinuous Galerkin methodMathematical optimizationMathematical analysisAlgorithmFinite element methodGeometryQuantum mechanicsThermodynamicsPhysicsModel Reduction and Neural NetworksAdvanced Numerical Methods in Computational MathematicsNumerical methods in engineering
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