A Posteriori Error Analysis of the Discontinuous Galerkin Method for Two-Dimensional Linear Hyperbolic Conservation Laws on Cartesian Grids

2016 ◽  
Vol 68 (3) ◽  
pp. 945-974 ◽  
Author(s):  
Mahboub Baccouch
Keyword(s):  
Discontinuous Galerkin ◽  
Discontinuous Galerkin Method ◽  
Hyperbolic Conservation Laws ◽  
Posteriori Error ◽  
Two Dimensional ◽  
A Posteriori ◽  
A Posteriori Error Analysis ◽  
A Posteriori Error ◽  
Hyperbolic Conservation ◽  
Posteriori Error Analysis

A Recovery-Based Error Estimator for the Discontinuous Galerkin Method for Transient Linear Hyperbolic Conservation Laws on Cartesian Grids

2017 ◽  
Vol 14 (06) ◽  
pp. 1750062 ◽  
Author(s):  
Mahboub Baccouch
Keyword(s):  
Error Estimate ◽  
Discontinuous Galerkin ◽  
Hyperbolic Conservation Laws ◽  
Directional Derivative ◽  
Posteriori Error ◽  
Error Estimator ◽  
A Posteriori ◽  
A Posteriori Error ◽  
Hyperbolic Conservation ◽  
Superconvergence Results

This paper is concerned with the application of the discontinuous Galerkin (DG) method to the solution of unsteady linear hyperbolic conservation laws on Cartesian grids. We present several superconvergence results and we construct a robust recovery-type a posteriori error estimator for the directional derivative approximation based on an enhanced recovery technique. We first identify a special numerical flux and a suitable initial discretization for which the [Formula: see text]-norm of the solution is of order [Formula: see text], when tensor product polynomials of degree at most [Formula: see text] are used. Then, we prove superconvergence towards a particular projection of the directional derivative. The order of superconvergence is proved to be [Formula: see text]. Moreover, we establish an [Formula: see text] global superconvergence for the solution flux at the outflow boundary of the domain. We also provide a simple derivative recovery formula which is [Formula: see text] superconvergent approximation to the directional derivative. We use the superconvergence results to construct asymptotically exact a posteriori error estimate for the directional derivative approximation by solving a local steady problem on each element. Finally, we prove that the a posteriori DG error estimate at a fixed time converges to the true error in the [Formula: see text]-norm at [Formula: see text] rate. Our results are valid without the flow condition restrictions. Numerical examples validating these theoretical results are presented.

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