An Efficient Algorithm with Stabilized Finite Element Method for the Stokes Eigenvalue Problem

This paper provides a two-space stabilized mixed finite element scheme for the Stokes eigenvalue problem based on local Gauss integration. The two-space strategy contains solving one Stokes eigenvalue problem using the P-1 - P-1 finite element pair and then solving an additional Stokes problem using the P-2 - P-2 finite element pair. Thepostprocessing technique which increases the order of mixed finite element space by using the same mesh can accelerate the convergence rate of the eigenpair approximations. Moreover, ourmethod can save a large amount of computational time and the corresponding convergence analysis is given. Finally, numerical results are presented to confirm the theoretical analysis.