Abstract
In this paper we discuss the stability of some Stokes finite elements. In particular, we consider a modification of Hood–Taylor and Bercovier–Pironneau schemes which consists in adding piecewise constant functions to the pressure space. This enhancement, which had been already used in the literature, is driven by the goal of achieving an improved mass conservation at element level. The main result consists in proving the inf-sup condition for the enhanced spaces in a general setting and to present some numerical tests which confirm the stability properties. The improvement in the local mass conservation is shown in a forthcoming paper (Boffi et al. In: Papadrakakis, M., Onate, E., Schrefler, B. (eds.) Coupled Problems 2011. Computational Methods for Coupled Problems in Science and Engineering IV, Cimne, 2011) where the presented schemes are used for the solution of a fluid-structure interaction problem.
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References
Bercovier, M., Pironneau, O.: Error estimates for finite element method solution of the Stokes problem in the primitive variables. Numer. Math. 33(2), 211–224 (1979)
Boffi, D.: Stability of higher order triangular Hood-Taylor methods for the stationary Stokes equations. Math. Models Methods Appl. Sci. 4(2), 223–235 (1994)
Boffi, D.: Three-dimensional finite element methods for the Stokes problem. SIAM J. Numer. Anal. 34(2), 664–670 (1997)
Boffi, D., Brezzi, F., Fortin, M.: Finite elements for the Stokes problem. In: Boffi, D., Gastaldi, L. (eds.) Mixed Finite Elements, Compatibility Conditions, and Applications. Lecture Notes in Mathematics, vol. 1939, pp. 45–100. Springer, Berlin (2008)
Boffi, D., Gastaldi, L., Heltai, L., Peskin, C.S.: On the hyper-elastic formulation of the immersed boundary method. Comput. Methods Appl. Mech. Eng. 197(25–28), 2210–2231 (2008)
Boffi, D., Cavallini, N., Gardini, F., Gastaldi, L.: Immersed boundary method: performance analysis of popular finite element spaces. In: Papadrakakis, M., Onate, E., Schrefler, B. (eds.) Coupled Problems 2011. Computational Methods for Coupled Problems in Science and Engineering IV, Cimne (2011)
Brezzi, F., Falk, R.S.: Stability of higher-order Hood-Taylor methods. SIAM J. Numer. Anal. 28(3), 581–590 (1991)
Brezzi, F., Fortin, M.: Mixed and Hybrid Finite Element Methods. Springer Series in Computational Mathematics, vol. 15. Springer, New York (1991)
Chapelle, D., Bathe, K.-J.: The inf-sup test. Comput. Struct. 47(4–5), 537–545 (1993)
Ciarlet, P.G.: The Finite Element Method for Elliptic Problems. North-Holland, Amsterdam (1978)
Glowinski, R.: Finite element methods for incompressible viscous flow. In: Handbook of Numerical Analysis. Handb. Numer. Anal., vol. IX, pp. 3–1176. North-Holland, Amsterdam (2003)
Gresho, P.M., Lee, R.L., Chan, S.T., Leone, J.M.: A new finite element for Boussinesq fluids. In: Pro. Third Int. Conf. on Finite Elements in Flow Problems, pp. 204–215. Wiley, New York (1980)
Griffiths, D.F.: The effect of pressure approximation on finite element calculations of compressible flows. In: Morton, K.W., Baines, M.J. (eds.) Numerical Methods for Fluid Dynamics, pp. 359–374. Academic Press, San Diego (1982)
Pierre, R.: Local mass conservation and C 0-discretizations of the Stokes problem. Houst. J. Math. 20(1), 115–127 (1994)
Qin, J., Zhang, S.: Stability of the finite elements 9/(4c+1) and 9/5c for stationary Stokes equations. Comput. Struct. 84(1–2), 70–77 (2005)
Scott, L.R., Vogelius, M.: Norm estimates for a maximal right inverse of the divergence operator in spaces of piecewise polynomials. Modél. Math. Anal. Numér. 19(1), 111–143 (1985)
Stenberg, R.: Analysis of mixed finite elements methods for the Stokes problem: a unified approach. Math. Comput. 42(165), 9–23 (1984)
Taylor, C., Hood, P.: A numerical solution of the Navier-Stokes equations using the finite element technique. Comput. Fluids 1(1), 73–100 (1973)
Thatcher, R.W.: Locally mass-conserving Taylor-Hood elements for two- and three-dimensional flow. Int. J. Numer. Methods Fluids 11(3), 341–353 (1990)
Tidd, D.M., Thatcher, R.W., Kaye, A.: The free surface flow of Newtonian and non-Newtonian fluids trapped by surface tension. Int. J. Numer. Methods Fluids 8(9), 1011–1027 (1988)
Verfürth, R.: Error estimates for a mixed finite element approximation of the Stokes equations. RAIRO. Anal. Numér. 18(2), 175–182 (1984)
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Boffi, D., Cavallini, N., Gardini, F. et al. Local Mass Conservation of Stokes Finite Elements. J Sci Comput 52, 383–400 (2012). https://doi.org/10.1007/s10915-011-9549-4
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DOI: https://doi.org/10.1007/s10915-011-9549-4