论文信息 - A new family of stable mixed finite elements for the 3D Stokes equations

A new family of stable mixed finite elements for the 3D Stokes equations

A natural mixed-element approach for the Stokes equations in the velocity-pressure formulation would approximate the velocity by continuous piecewise-polynomials and would approximate the pressure by discontinuous piecewise-polynomials of one degree lower. However; many such elements are unstable in 2D and 3D. This paper is devoted to proving that the mixed finite elements of this P k -P k-1 type when k > 3 satisfy the stability condition-the Babuska-Brezzi inequality on macro-tetrahedra meshes where each big tetrahedron is subdivided into four subtetrahedra. This type of mesh simplifies the implementation since it has no restrictions on the initial mesh. The new element also suits the multigrid method.

Shangyou Zhang | Shangyou Zhang

[1] Philippe G. Ciarlet,et al. The finite element method for elliptic problems , 2002, Classics in applied mathematics.

[2] Jean E. Roberts,et al. Mixed and hybrid finite element methods , 1987 .

[3] L. R. Scott,et al. Norm estimates for a maximal right inverse of the divergence operator in spaces of piecewise polynomials , 1985 .

[4] Rolf Stenberg,et al. On some three-dimensional finite elements for incompressible media , 1987 .

[5] Shangyou Zhang,et al. An optimal order multigrid method for biharmonic,C1 finite element equations , 1989 .

[6] L. R. Scott,et al. Finite element interpolation of nonsmooth functions satisfying boundary conditions , 1990 .

[7] Shangyou Zhang. Optimal-order nonnested multigrid methods for solving finite element equations. I. On quasi-uniform meshes , 1990 .

[8] M. Fortin,et al. A stable finite element for the stokes equations , 1984 .

[9] F. Thomasset. Finite element methods for Navier-Stokes equations , 1980 .

[10] R. Stenberg. Analysis of mixed finite elements methods for the Stokes problem: a unified approach , 1984 .