Abstract

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 finite element pair and then solving an additional Stokes problem using the finite element pair. The postprocessing 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, our method 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.

1. Introduction

The Stokes eigenvalue problem is one of the most important eigenvalue problems and plays an important role in the stability analysis of nonlinear partial differential equations [1]. The eigenvalue problems are used in many application areas: structural mechanics and fluid mechanics. Thus, development of the efficient numerical methods for studying the eigenvalue problems has practical meanings and has been noticed by many researchers. At the time of writing, numerous works are devoted to these problems (see [2–10] and the references cited therein).

Many effective postprocessing strategies that improve the convergence rate for the approximations of the eigenvalue problems by the finite element methods have been well developed. The two-grid method is one of these efficient postprocessing methods. The basic idea of two-grid scheme is first introduced by Xu [11, 12] for the nonsymmetric and nonlinear elliptic problems. Hence, it can be seen as a postprocessing technique and can take less CPU time compared to the one grid methods. To the best of our knowledge, some details of the two-grid scheme can be found in the works of Xu and Zhou [13], Chien and Jeng [14, 15], Chen et al. [7, 16], Hu and Cheng [17], Yang et al. [18, 19], Huang et al. [8], and Weng et al. [20, 21]. The two-space method is actually the iterative Galerkin method, which was first used for solving integral equation eigenvalue problems by Sloan [22] and differential equation eigenvalue problems by Lin and Xie [23]. Particularly, Racheva and Andreev [24] have proposed a postprocessing method for the -order self-adjoint eigenvalue problems by two-grid method or the two-space method. A similar method has been given for the Stokes eigenvalue problem [7, 25], elliptic eigenvalue problem [16], and the biharmonic eigenvalue problem [26] by mixed finite element methods.

In fact, two-space method [27–29] can be cast in the framework of Xu’s work regarding the two-grid method. However, the two-space method is different from the two-grid method. This two-space method consists in solving the original Stokes eigenvalue problem in the -order mixed finite element space and one additional Stokes source problem in an augmented mixed finite element space by a -order mixed finite element space on the same mesh. Besides, the two-space method only needs one mesh size while the two-grid method needs two mesh sizes, a coarse mesh, and a fine mesh. In fact, the two-space method can avoid the discussion on the relation of the coarse and fine meshes. For this reason, in the present paper we establish a two-space discretization scheme for the Stokes eigenvalue problem.

Recently, more attention has been paid to the lowest equal order finite element pairs for simulating the incompressible flow. The lowest equal order finite element pairs offer some computational advances; for example, they are simple and have practical uniform data structure and adequate accuracy, because they show an identical degree distribution for both the velocity and pressure. Moreover, they are of practical importance in scientific computation owing to their very convenient computational cost. However, the lowest equal order mixed finite element pairs do not satisfy the inf-sup condition. Numerical tests show that the violation of the inf-sup condition often brings about unphysical pressure oscillations. In order to avoid the instability problem, the stabilized finite element methods are applied to the incompressible flow. Therefore, a lot of work focuses on stabilization (see [30–37]) of the lowest equal order pairs. Particularly, based on the work of Bochev et al. [30], Li et al. [31, 32] used the projection of the pressure onto the piecewise constant space to add the stabilized term for element and Zheng et al. [35] used the projection of the pressure-gradient onto the piecewise constant space to add the stabilized term for element.

Influenced by the work mentioned above, the paper focuses on the method, which combines two-space discretization scheme with a stabilized finite element method based on local Gauss integration technique for the Stokes eigenvalue problem. The paper is organized as follows. In Section 2, we introduce the studied Stokes eigenvalue problem and the notations and some well-known results used throughout this paper. Some stabilized finite element strategies based on two local Gauss integrations are recalled in Section 3. In Section 4, a two-space stabilized finite element algorithm is constructed and its error estimates are discussed. In Section 5, numerical experiments are reported for illustrating the theoretical results and the high efficiency of the proposed method. Finally, we will conclude our presentation in Section 6 with a few comments and also possible future research topics.

2. Preliminaries

In this paper, we consider the following Stokes eigenvalue problem:where is a bounded and convex domain with a Lipschitz-continuous boundary , represents the pressure, is the velocity vector, and is the eigenvalue.

We shall introduce the following Hilbert spaces: The spaces , , are equipped with the -scalar product and -norm . The norm and seminorm in are denoted by and , respectively. The space is equipped with the norm or its equivalent norm due to Poincaré inequality. Spaces consisting of vector-valued functions are denoted in boldface. Furthermore, the norm in the space dual to is given byTherefore, we define the following bilinear forms , , and on , , and , respectively, by and a generalized bilinear form on ; that is,

With the above notations, the variational formulation of problem (1) reads as follows: Find with , such thatFrom [1], we know that eigenvalue problem (6) has an eigenvalue sequence and corresponding eigenvectors with the orthogonal property .

Let

Moreover, the bilinear form satisfies the inf-sup condition for all where is a constant depending only on . Therefore, the generalized bilinear form satisfies the continuity property and coercive conditionwhere and are the positive constants depending only on . Throughout the paper we use or to denote a generic positive constant whose value may change from place to place, which remains independent of the mesh parameter.

3. A Stabilized Mixed Finite Element Method

From now on, is a real positive parameter tending to . The finite element subspaces of are characterized by , a partitioning of into triangles with the mesh size , assumed to be uniformly regular in the usual sense [38]. Then we define them as follows: where represents the set of all polynomials on of degree less than and denotes the space of bubble functions. The bubble functions are defined as follows: where are area coordinates on , . The area coordinate is also known as a triangle barycentre coordinate, where the three components are of the ratio between the area of the three triangles and the area of the mother triangle.

It is known that this choice of the approximate spaces or satisfies the inf-sup condition in [38], but this choice of the approximate spaces or does not satisfy the inf-sup condition [30, 32, 35]. As a consequence, we give a stabilized finite element approximation based on local Gauss integration technique (see [32, 35]). The idea is as follows.

Let be the standard -projection: where .

The projection operator has the following properties: The stabilized bilinear terms are used byand the stabilization term is given by

The stabilized term which is defined by local Gaussian quadrature can be rewritten as where denotes a Gaussian quadrature over which is exact for polynomials of degree . In particular, when , the trial function is projected to the piecewise constant space. Besides, the stabilized term can be rewritten as where the trial function must be projected to when for any . Indeed, Becker and Hansbo have found [33] that the stabilized methods of [30, 32] are identical from a numerical point of view for these low-order approximations.

By adding the stabilization term into the generalized bilinear form , we define

Then the corresponding discrete variational formulation for the Stokes eigenvalue problem reads as follows: find with , such thatand find with , such that

Remark 1. For the () pair which satisfy inf-sup condition, there are points of difference between them. The stabilized method in this article only adds the stabilized term with respect to the pressure space. However, the method has the implicit stabilized term in the velocity space.

With and thanks to the positive definiteness of , we deduce that the discrete eigenvalues are positive. Let the eigenvalue of (21) be ordered as follows: and let us consider the corresponding eigenfunctions where denotes the dimension of the finite element space.

Similarly, let be the eigenspace associated with ; that is,

For (22) with pairs, it can be given similarly. The corresponding nature of the eigenvalues is omitted for the sake of simplicity.

The next theorem shows the continuity property and the weak coercivity property of the bilinear form for the finite element space in [35] and for the finite element space in [30, 32].

Theorem 2. For all , there exist positive constants and , independent of , such that Moreover, for all , there exist positive constants and , independent of , such that

The next theorem contains the convergence result of eigenfunctions and eigenvalues for the Stokes eigenvalue problem in [8, 20].

Theorem 3. With belonging to and being the exact solution of (6), one deduces that there exists a discrete eigenpair of (21) which satisfies the following error estimates:

Furthermore, if the exact solution , then of problem (22) satisfies

4. Two-Space Stabilized Finite Element Scheme and Error Estimates

In this section, we shall present a two-space stabilized finite element algorithm to reduce the computational cost. The two-space stabilized finite element approximation consists of three steps.

Step 1. On the mesh size , solve the following Stokes eigenvalue problem by pair and find and , such that, for all ,

Step 2. On the same mesh size , solve the following Stokes problem by pair and find such that for all

Step 3. Compute the eigenvalue by the Rayleigh quotientwhere

Next, we will study the convergence of the two-space stabilized finite element solution. To do this, we define the Galerkin projection operator byBy Theorem 2, is well defined and the following approximation properties are fulfilled in [20].

Lemma 4. For all , one has

The following identity that relates the errors in the eigenvalue and eigenvector can be found in [3].

Lemma 5. Let be an eigenpair of (6); for any and , one has

The next theorem provides the error estimates for our two-space scheme.

Theorem 6. Let be the th discrete eigenpair. Then the th eigenpair of the Stokes operator is such that