论文信息 - An analysis of the discontinuous Galerkin method for a scalar hyperbolic equation

An analysis of the discontinuous Galerkin method for a scalar hyperbolic equation

We prove Lp stability and error estimates for the discontinuous Galerkin method when applied to a scalar linear hyperbolic equation on a convex polygonal plane domain. Using finite element analysis techniques, we obtain L2 estimates that are valid on an arbitrary locally regular triangulation of the domain and for an arbitrary degree of polynomials. Lp estimates for p * 2 are restricted to either a uniform or piecewise uniform triangulation and to polynomials of not higher than first degree. The latter estimates are proved by combining finite difference and finite element analysis techniques.

Juhani Pitkäranta | Claes Johnson | J. Pitkäranta | Claes Johnson

[1] P. Raviart,et al. On a Finite Element Method for Solving the Neutron Transport Equation , 1974 .

[2] Vidar Thomée,et al. Besov Spaces and Applica-tions to DiKerence Methods for Initial Value Problems , 1975 .

[3] Juhani Pitkäranta,et al. CONVERGENCE OF A FULLY DISCRETE SCHEME FOR TWO-DIMENSIONAL NEUTRON TRANSPORT* , 1983 .

[4] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.

[5] J. Bramble,et al. Estimation of Linear Functionals on Sobolev Spaces with Application to Fourier Transforms and Spline Interpolation , 1970 .

[6] Claes Johnson,et al. Finite element methods for linear hyperbolic problems , 1984 .

[7] G. W. Hedstrom. The Rate of Convergence of Some Difference Schemes , 1968 .

[8] V. Thomée,et al. Estimates Near Discontinuities for Some Difference Schemes. , 1971 .