Rectangular C1-Qk Bell finite elements in two and three dimensions

Abstract

Both the function and its normal derivative on the element boundary are Qk polynomials for the Bogner-Fox-Schmit C1-Qk finite element functions. Mathematically, to keep the optimal order of approximation, their spaces are required to include Pk and Pk-1 polynomials respectively. We construct a Bell type C1-Qk finite element on rectangular meshes in 2D and 3D, which has its normal derivative as a Qk-1 polynomial on each face, for k 4. We show, with a big reduction of the space, the C1-Qk Bell finite element retains the optimal order of convergence. Numerical experiments are performed, comparing the new elements with the original elements.