Abstract
In this paper, we consider the Galerkin finite element method (FEM) for the Kelvin-Voigt viscoelastic fluid flow model with the lowest equal-order pairs. In order to overcome the restriction of the so-called inf-sup conditions, a pressure projection method based on the differences of two local Gauss integrations is introduced. Under some suitable assumptions on the initial data and forcing function, we firstly present some stability and convergence results of numerical solutions in spatial discrete scheme. By constructing the dual linearized Kelvin-Voigt model, stability and optimal error estimates of numerical solutions in various norms are established. Secondly, a fully discrete stabilized FEM is introduced, the backward Euler scheme is adopted to treat the time derivative terms, the implicit scheme is used to deal with the linear terms and semi-implicit scheme is applied to treat the nonlinear term, unconditional stability and convergence results are also presented. Finally, some numerical examples are presented to verify the developed theoretical analysis and show the performances of the considered numerical schemes.
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Pani, A.K., Yuan, J.Y.: Semidiscrete finite element Galerkin approximations to the equations of motion arising in the oldroyd model. IMA J. Numer. Anal. 25, 750–782 (2005)
Pani, A.K., Yuan, J.Y., Damazio, P.: On a linearized backward Euler method for the equations of motion of oldroyd fluids of order one. SIAM J. Numer. Anal. 44, 804–825 (2006)
Zhang, T., Yuan, J.Y.: A stabilized characteristic finite element method for the viscoelastic oldroyd fluid motion problem. Int. J. Numer. Anal. Model. 12, 617–635 (2015)
Pavlovskii, V.A.: To the question of theoretical description of weak aqueous polymer solutions. Soviet physics-Doklady 200, 809–812 (1971)
Oskolkov, A.P.: The uniqueness and global solvability of boundary-value problems for the equations of motion for aqueous solutions of polymers. Journal of Soviet Mathematics 8(4), 427–455 (1977)
Cao, Y., Lunasin, E., Titi, E.S.: Global wellposedness of the three dimensional viscous and inviscid simplified Bardina turbulence models. Commun. Math. Sci. 4, 823–848 (2006)
Cotter, C.S., Smolarkiewicz, P.K., Szezyrba, I.N.: A viscoelastic model from brain injuries. Int. J. Numer. Methods Fluids 40, 303–311 (2002)
Oskolkov, A.P.: On an estimate, uniform on the semiaxis t ≥ 0, for the rate of convergence of Galerkin approximations for the equations of motion of Kelvin-Voight fluids. Journal of Soviet Mathematics 62, 2802–2806 (1992)
Pani, A.K., Pany, A.K., Damazio, P., Yuan, J.Y.: A modified nonlinear spectral Galerkin method for the equations of motion arising in the Kelvin-Voigt fluids. Appl. Anal. 93, 1587–1610 (2014)
Bajpai, S., Nataraj, N., Pani, A.K.: On fully discrete finite element schemes for equations of motion of Kelvin-Voigt fluids. Int. J. Numer. Anal. Model. 10, 481–507 (2013)
Pany, A.K.: Fully discrete second-order backward difference method for Kelvin-Voigt fluid flow model. Numerical Algorithms 78, 1061–1086 (2018)
Pany, A.K., Paikray, A.K., Padhy, S., Pani, A.K.: Backward Euler schemes for the Kelvin-Voigt viscoelastic fluid flow model. Int. J. Numer. Anal. Model. 14, 126–151 (2017)
Bajpai, S., Nataraj, N.: On a two-grid finite element scheme combined with Crank-Nicolson method for the equations of motion arising in the Kelvin-Voigt model. Computer & Mathematics with Applications 68, 2277–2291 (2014)
Bajpai, S., Nataraj, N., Pani, A.K.: On a two-grid finite element scheme for the equations of motion arising in Kelvin-Voigt model. Adv. Comput. Math. 40, 1043–1071 (2014)
Giraut, V., Raviart, P.: Finite element approximation of the Navier-Stokes equations. Springer, Berlin (1979)
Temam, R.: Navier-Stokes equations, theory and numerical analysis. North-Holland Pub. Co, Amsterdam (1984)
Bochev, P., Dohrmann, C., Gunzburger, M.: Stabilization of low-order mixed finite elements for the Stokes equations. SIAM J. Numer. Anal. 44, 82–101 (2006)
Dohrmann, C., Bochev, P.: A stabilized finite element method for the Stokes problem based on polynomial pressure projections. Int. J. Numer. Methods Fluids 46, 183–201 (2004)
He, Y.N., Lin, Y.P., Sun, W.W.: Stabilized finite element method for the non-stationary Navier-Stokes problem. Discrete and Continuous Dynamical Systems-B 6, 41–68 (2006)
Li, J., He, Y.N., Chen, Z.X.: A new stabilized finite element method for the transient Navier-Stokes equations. Comput. Methods Appl. Mech. Eng. 197, 22–35 (2007)
Huang, P.Z., Feng, X.L., Liu, D.M.: A stabilized finite element method for the time-dependent Stokes equations based on Crank-Nicolson scheme. Appl. Math. Model. 37, 1910–1919 (2013)
Bajpai, S., Nataraj, N., Pani, A.K., Damazio, P., Yuan, J.Y.: Semidiscrete Galerkin method for equations of motion arising in Kelvin-Voigt model of viscoelastic fluid flow. Numerical Methods for Partial Differential Equations 29, 857–883 (2013)
Pany, A.K., Bajpai, S., Pani, A.K.: Optimal error estimates for semidiscrete Galerkin approximations to equations of motion described by Kelvin-Voigt viscoelastic fluid flow model. J. Comput. Appl. Math. 302, 234–257 (2016)
Ciarlet, P.: The Finite Element Method for Elliptic Problems. SIAM Publications, North-Holland, Amsterdam (2002)
Feng, X.L., He, Y.N., Huang, P.Z.: A stabilized implicit fractional-step method for the time-dependent Navier-Stokes equations using equal-order pairs. J. Math. Anal. Appl. 392, 209–224 (2012)
Heywood, J.G., Rannacher, R.: Finite element approximation of the nonstationary Navier-Stokes problem. I. Regularity of solutions and second-order error estimates for spatial discretization. SIAM J. Numer. Anal. 19, 275–311 (1982)
Hill, A.T., Süli, E.: Approximation of the global attractor for the incompressible Navier-Stokes problem. IMA J. Numer. Anal. 20, 633–667 (2000)
He, Y.N.: A fully discrete stabilized finite-element method for the time-dependent Navier-Stokes problem. IMA J. Numer. Anal. 23, 665–691 (2003)
Arnold, D.N., Brezzi, F., FortinLi, M.: A stable finite element for the Stokes equations. Calcolo 21, 337–344 (1984)
Gerbeau, J.F., Bris, C., Lelievre, T.: Mathematical Method for the Magnetohydrodynamics of Liquid Metals. Oxford University Press, Oxford (2006)
Boffi, D., Brezzi, F., Fortin, M.: Mixed Finite Element Methods and Applications. Springer, Heidelberg, New York, Dordrecht, London (2010)
Ghia, U., Ghia, K.N., Shin, C.T.: High-resolutions for incompressible flow using the Navier-Stokes equations and a multigrid method. J. Comput. Phys. 48, 387–411 (1982)
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This work was supported by NSF of China (No. 11971152).
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Zhang, T., Duan, M. Stability and convergence analysis of stabilized finite element method for the Kelvin-Voigt viscoelastic fluid flow model. Numer Algor 87, 1201–1228 (2021). https://doi.org/10.1007/s11075-020-01005-5
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DOI: https://doi.org/10.1007/s11075-020-01005-5
Keywords
- Stabilized method
- Kelvin-Voigt viscoelastic fluid flow model
- The lowest equal-order mixed elements
- The L’Hospital rule
- Negative norm technique