Paper Info
Title
An a posteriori estimator of eigenvalue/eigenvector error for penalty-type discontinuous Galerkin methods.
Abstract
We provide an abstract framework for analyzing discretization error for eigenvalue problems discretized by discontinuous Galerkin methods such as the local discontinuous Galerkin method and symmetric interior penalty discontinuous Galerkin method. The analysis applies to clusters of eigenvalues that may include degenerate eigenvalues. We use asymptotic perturbation theory for linear operators to analyze the dependence of eigenvalues and eigenspaces on the penalty parameter. We first formulate the DG method in the framework of quadratic forms and construct a companion infinite dimensional eigenvalue problem. With the use of the companion problem, the eigenvalue/vector error is estimated as a sum of two components. The first component can be viewed as a non-conformity error that we argue can be neglected in practical estimates by properly choosing the penalty parameter. The second component is estimated a posteriori using auxiliary subspace techniques, and this constitutes the practical estimate.
Year
DOI
Venue
2018
10.1016/j.amc.2017.07.007
Applied Mathematics and Computation
Keywords
Field
DocType
65N15, A posteriori error estimates, Discontinuous Galerkin method, Eigenvalue problem, Finite element method, Primary: 65N30, Secondary: 65N25
Discontinuous Galerkin method,Degenerate energy levels,Discretization,Mathematical optimization,Subspace topology,Quadratic form,Mathematical analysis,Finite element method,Mathematics,Eigenvalues and eigenvectors,Estimator
Journal
Volume
ISSN
Citations 
319
0096-3003
0
PageRank 
References 
Authors
0.34
11
4
Name
Order
Citations
PageRank
Stefano Giani1369.55
luka grubisic232.80
Harri Hakula34710.80
Jeffrey S. Ovall4488.39