SFEM for the Lagrangian formulation of the surface Stokes problem

We consider the surface Stokes equation with Lagrange multiplier and approach it numerically. Using a Taylor-Hood surface finite element method, along with an appropriate estimation for the additional Lagrange multiplier, we establish optimal convergence results for the velocity in $H^1$ and $L^2$, and in $L^2$ for the two pressures. Furthermore, we present a new inf-sup condition to help with the stability and convergence results. This formulation offers the advantage of simplified implementation without approximating geometric quantities, although it requires a higher approximation of the parameterized surface. In addition, we provide numerical simulations that confirm the established error bounds and perform a comparative analysis against the penalty approach.