Penalty method with P1/P1 finite element approximation for the Stokes equations under slip boundary condition

Abstract

We consider the P1/P1 or P1b/P1 finite element approximations to the Stokes equations in a bounded smooth domain subject to the slip boundary condition. A penalty method is applied to address the essential boundary condition u· n = g on ∂Ω, which avoids a variational crime and simultaneously facilitates the numerical implementation. We give O(h1/2 + ε1/2 + h/ε1/2)-error estimate for velocity and pressure in the energy norm, where h and ε denote the discretization parameter and the penalty parameter, respectively. In the two-dimensional case, it is improved to O(h + ε1/2 + h2/ε1/2) by applying reduced-order numerical integration to the penalty term. The theoretical results are confirmed by numerical experiments.