Explicit Estimation of Error Constants Appearing in Non-conforming Linear Triangular Finite Element

Abstract

The non-conforming linear (P1) triangular FEM can be viewed as a kind of the discontinuous Galerkin method, and is attractive in both theoretical and practical senses. Since various error constants must be quantitatively evaluated for its accurate a priori and a posteriori error estimates, we derive their theoretical upper bounds and some computational results. In particular, the Babuska-Aziz maximum angle condition is required just as in the case of the conforming P1 triangle. Some applications and numerical results are also illustrated to see the validity and effectiveness of our analysis.