A new discretization for mth-Laplace equations with arbitrary polynomial degrees

Abstract

This paper introduces new mixed formulations and discretizations for mth-Laplace equations of the form (-1)mΔm u=f for arbitrary m=1,2,3,… based on novel Helmholtz-type decompositions for tensor-valued functions. The new discretizations allow for ansatz spaces of arbitrary polynomial degree and the lowest-order choice coincides with the non-conforming FEMs of Crouzeix and Raviart for m=1 and of Morley for m=2. Since the derivatives are directly approximated, the lowest-order discretizations consist of piecewise affine and piecewise constant functions for any m=1,2,… Moreover, a uniform implementation for arbitrary m is possible. Besides the a priori and a posteriori analysis, this paper proves optimal convergence rates for adaptive algorithms for the new discretizations.