Superconvergence of the Qk+1,k-Qk,k+1 divergence-free finite element

Abstract

By the standard theory, the stable Qk+1,k-Qk,k+1/Qkdc' divergence-free element converges with the optimal order of approximation for the Stokes equations, but only order k for the velocity in H1-norm and the pressure in L2-norm. This is due to one polynomial degree less in y direction for the first component of velocity, a Qk+1,k polynomial. In this manuscript, we will show a superconvergence of the divergence free element that the order of convergence is truly k+1, for both velocity and pressure. Numerical tests are provided confirming the sharpness of the theory.