Reconstructed Discontinuous Approximation to Stokes Equation in A Sequential Least Squares Formulation

We propose a new least squares finite element method to solve the Stokes problem with two sequential steps. The approximation spaces are constructed by patch reconstruction with one unknown per element. For the first step, we reconstruct an approximation space consisting of piecewise curl-free polynomials with zero trace. By this space, we minimize a least squaresfunctional toobtain thenumericalapproximationstothe gradientof thevelocityand the pressure. In the second step, we minimize another least squares functional to give the solution to the velocity in the reconstructed piecewise divergence-free space. We derive error estimates for all unknowns under L2 norms and energy norms. Numerical results in two dimensions and three dimensions verify the convergence rates and demonstrate the great flexibility of our method.

[1]  Zhiqiang Cai,et al.  Least-Squares Methods for Elasticity and Stokes Equations with Weakly Imposed Symmetry , 2019, Comput. Methods Appl. Math..

[2]  R. Kellogg,et al.  A regularity result for the Stokes problem in a convex polygon , 1976 .

[3]  Ruo Li,et al.  A least squares method for linear elasticity using a patch reconstructed space , 2019, 1903.07405.

[4]  Ohannes A. Karakashian,et al.  Piecewise solenoidal vector fields and the Stokes problem , 1990 .

[5]  Ruo Li,et al.  Solving Eigenvalue Problems in a Discontinuous Approximation Space by Patch Reconstruction , 2019, SIAM J. Sci. Comput..

[6]  Susanne C. Brenner,et al.  Poincaré-Friedrichs Inequalities for Piecewise H1 Functions , 2003, SIAM J. Numer. Anal..

[7]  T. Manteuffel,et al.  First-Order System Least Squares for the Stokes Equations, with Application to Linear Elasticity , 1997 .

[8]  Annalisa Buffa,et al.  Mimetic finite differences for elliptic problems , 2009 .

[9]  Ohannes A. Karakashian,et al.  Convergence of Adaptive Discontinuous Galerkin Approximations of Second-Order Elliptic Problems , 2007, SIAM J. Numer. Anal..

[10]  M. Fortin,et al.  Finite Elements for the Stokes Problem , 2008 .

[11]  M. Larson,et al.  DISCONTINUOUS/CONTINUOUS LEAST-SQUARES FINITE ELEMENT METHODS FOR ELLIPTIC PROBLEMS , 2005 .

[12]  Thomas A. Manteuffel,et al.  On Mass-Conserving Least-Squares Methods , 2006, SIAM J. Sci. Comput..

[13]  M. Gunzburger,et al.  Analysis of least squares finite element methods for the Stokes equations , 1994 .

[14]  K. Liu,et al.  Hybrid First-Order System Least Squares Finite Element Methods with Application to Stokes Equations , 2013, SIAM J. Numer. Anal..

[15]  Rickard Bensow,et al.  Discontinuous Least-Squares finite element method for the Div-Curl problem , 2005, Numerische Mathematik.

[16]  Thomas A. Manteuffel,et al.  First-Order System Least Squares for the Stokes and Linear Elasticity Equations: Further Results , 2000, SIAM J. Sci. Comput..

[17]  Ruo Li,et al.  A Sequential Least Squares Method for Poisson Equation Using a Patch Reconstructed Space , 2020, SIAM J. Numer. Anal..

[18]  Zhiqiang Cai,et al.  Least Squares for the Perturbed Stokes Equations and the Reissner-Mindlin Plate , 2000, SIAM J. Numer. Anal..

[19]  Ruo Li,et al.  An Arbitrary-Order Discontinuous Galerkin Method with One Unknown Per Element , 2018, Journal of Scientific Computing.

[20]  D. Arnold An Interior Penalty Finite Element Method with Discontinuous Elements , 1982 .

[21]  Ruo Li,et al.  An Efficient High Order Heterogeneous Multiscale Method for Elliptic Problems , 2012, Multiscale Model. Simul..

[22]  Pavel B. Bochev,et al.  A non‐conforming least‐squares finite element method for incompressible fluid flow problems , 2013 .

[23]  Luke N. Olson,et al.  A locally conservative, discontinuous least‐squares finite element method for the Stokes equations , 2012 .

[24]  G. Paulino,et al.  PolyMesher: a general-purpose mesh generator for polygonal elements written in Matlab , 2012 .

[25]  Byeong-Chun Shin,et al.  Least‐squares spectral method for velocity‐vorticity‐pressure form of the Stokes equations , 2016 .

[26]  Alexander Schwarz,et al.  Efficient stress–velocity least-squares finite element formulations for the incompressible Navier–Stokes equations , 2018, Computer Methods in Applied Mechanics and Engineering.