A new error bound for reduced basis approximation of parabolic partial differential equations
Author(s)
Urban, Karsten; Patera, Anthony T.
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We consider a space–time variational formulation for linear parabolic partial differential equations. We introduce an associated Petrov–Galerkin truth finite element discretization with favorable discrete inf-sup constant β[subscript δ]:β[subscript δ] is unity for the heat equation; β[subscript δ] grows only linearly in time for non-coercive (but asymptotically stable) convection operators. The latter in turn permits effective long-time a posteriori error bounds for reduced basis approximations, in sharp contrast to classical (pessimistic) exponentially growing energy estimates.
Date issued
2012-02Department
Massachusetts Institute of Technology. Department of Mechanical EngineeringJournal
Comptes Rendus Mathematique
Publisher
Elsevier
Citation
Urban, Karsten, and Anthony T. Patera. “A New Error Bound for Reduced Basis Approximation of Parabolic Partial Differential Equations.” Comptes Rendus Mathematique 350, no. 3–4 (February 2012): 203–207.
Version: Author's final manuscript
ISSN
1631073X