论文信息 - An Interior Penalty Finite Element Method with Discontinuous Elements

An Interior Penalty Finite Element Method with Discontinuous Elements

A new semidiscrete finite element method for the solution of second order nonlinear parabolic boundary value problems is formulated and analyzed. The test and trial spaces consist of discontinuous piecewise polynomial functions over quite general meshes with interelement continuity enforced approximately by means of penalties. Optimal order error estimates in energy and $L^2$-norms are stated in terms of locally expressed quantities. They are proved first for a model problem and then in general.

D. Arnold

[1] S. Agmon. Lectures on Elliptic Boundary Value Problems , 1965 .

[2] J. Nitsche. Über ein Variationsprinzip zur Lösung von Dirichlet-Problemen bei Verwendung von Teilräumen, die keinen Randbedingungen unterworfen sind , 1971 .

[3] I. Babuska. The Finite Element Method with Penalty , 1973 .

[4] I. Babuska,et al. Nonconforming Elements in the Finite Element Method with Penalty , 1973 .

[5] O. C. Zienkiewicz,et al. Constrained variational principles and penalty function methods in finite element analysis , 1974 .

[6] J. Douglas,et al. Interior Penalty Procedures for Elliptic and Parabolic Galerkin Methods , 1976 .

[7] G. A. Baker. Finite element methods for elliptic equations using nonconforming elements , 1977 .

[8] P. Percell,et al. A Local Residual Finite Element Procedure for Elliptic Equations , 1978 .

[9] M. Wheeler. An Elliptic Collocation-Finite Element Method with Interior Penalties , 1978 .