DGKdV_Apost_v3_sro.pdf (678.6 kB)
A posteriori error estimates for discontinuous Galerkin Methods for the Generalised Korteweg-de Vries Equation
journal contribution
posted on 2023-06-09, 11:44 authored by Ohannes Karakashian, Charalambos MakridakisCharalambos MakridakisWe construct, analyze and numerically validate a posteriori error estimates for conservative discontinuous Galerkin (DG) schemes for the Generalized Korteweg-de Vries (GKdV) equation. We develop the concept of dispersive reconstruction, i.e., a piecewise polynomial function which satisfies the GKdV equation in the strong sense but with a computable forcing term enabling the use of a priori error estimation techniques to obtain computable upper bounds for the error. Both semidiscrete and fully discrete approximations are treated.
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Publication status
- Published
File Version
- Accepted version
Journal
Mathematics of ComputationISSN
0025-5718Publisher
American Mathematical SocietyExternal DOI
Volume
84Page range
1145-1167Department affiliated with
- Mathematics Publications
Research groups affiliated with
- Numerical Analysis and Scientific Computing Research Group Publications
Full text available
- Yes
Peer reviewed?
- Yes
Legacy Posted Date
2018-01-24First Open Access (FOA) Date
2018-01-24First Compliant Deposit (FCD) Date
2018-01-24Usage metrics
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