Journal of Computational and Applied Mathematics Finite Element Analysis for the Axisymmetric Laplace Operator on Polygonal Domains

Abstract Let L ≔ − r − 2 ( r ∂ r ) 2 − ∂ z 2 . We consider the equation L u = f on a bounded polygonal domain with suitable boundary conditions, derived from the three-dimensional axisymmetric Poisson’s equation. We establish the well-posedness, regularity, and Fredholm results in weighted Sobolev spaces, for possible singular solutions caused by the singular coefficient of the operator L , as r → 0 , and by non-smooth points on the boundary of the domain. In particular, our estimates show that there is no loss of regularity of the solution in these weighted Sobolev spaces. Besides, by analyzing the convergence property of the finite element solution, we provide a construction of improved graded meshes, such that the quasi-optimal convergence rate can be recovered on piecewise linear functions for singular solutions. The introduction of a new projection operator from the weighted space to the finite element subspace, certain scaling arguments, and a calculation of the index of the Fredholm operator, together with our regularity results, are the ingredients of the finite element estimates.

[1]  V. A. Kondrat'ev,et al.  Boundary problems for elliptic equations in domains with conical or angular points , 1967 .

[2]  Thomas Apel,et al.  Graded Mesh Refinement and Error Estimates for Finite Element Solutions of Elliptic Boundary Value P , 1996 .

[3]  B. Mercier,et al.  Résolution d’un problème aux limites dans un ouvert axisymétrique par éléments finis en $r, z$ et séries de Fourier en $\theta $ , 1982 .

[4]  Monique Dauge,et al.  Spectral Methods for Axisymmetric Domains , 1999 .

[5]  B. Heinrich,et al.  The Fourier-Finite-Element Method for Poisson's Equation in Axisymmetric Domains with Edges , 1996 .

[6]  Jinchao Xu,et al.  Iterative Methods by Space Decomposition and Subspace Correction , 1992, SIAM Rev..

[7]  I. Babuska,et al.  Acta Numerica 2003: Survey of meshless and generalized finite element methods: A unified approach , 2003 .

[8]  Wen Lea Pearn,et al.  (Journal of Computational and Applied Mathematics,228(1):274-278)Optimization of the T Policy M/G/1 Queue with Server Breakdowns and General Startup Times , 2009 .

[9]  Ivo Babuska,et al.  Finite element method for domains with corners , 1970, Computing.

[10]  I. Babuska,et al.  ON THE ANGLE CONDITION IN THE FINITE ELEMENT METHOD , 1976 .

[11]  Hengguang Li,et al.  ANALYSIS OF THE FINITE ELEMENT METHOD FOR TRANSMISSION/MIXED BOUNDARY VALUE PROBLEMS ON GENERAL POLYGONAL DOMAINS ∗ , 2010 .

[12]  Franck Assous,et al.  Theoretical tools to solve the axisymmetric Maxwell equations , 2002 .

[13]  T. Dupont,et al.  Polynomial approximation of functions in Sobolev spaces , 1980 .

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

[15]  Douglas N. Arnold,et al.  Well-posedness of the fundamental boundary value problems for constrained anisotropic elastic materials , 1987 .

[16]  Hamilton-Jacobi Equations,et al.  Multigrid Methods for , 2011 .

[17]  Ivo Babuška,et al.  Regularity of the solutions for elliptic problems on nonsmooth domains in ℝ3, Part I: countably normed spaces on polyhedral domains , 1997, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.

[18]  Susanne C. Brenner,et al.  Convergence of nonconforming V-cycle and F-cycle multigrid algorithms for second order elliptic boundary value problems , 2003, Math. Comput..

[19]  Joseph E. Pasciak,et al.  The convergence of V-cycle multigrid algorithms for axisymmetric Laplace and Maxwell equations , 2006, Math. Comput..

[20]  Vladimir Maz’ya,et al.  Spectral Problems Associated with Corner Singularities of Solutions to Elliptic Equations , 2000 .

[21]  Ludmil T. Zikatanov,et al.  Improving the rate of convergence of ‘high order finite elements’ on polygons and domains with cusps , 2005, Numerische Mathematik.

[22]  Thomas A. Manteuffel,et al.  Weighted-Norm First-Order System Least-Squares (FOSLS) for Div/Curl Systems with Three Dimensional Edge Singularities , 2008, SIAM J. Numer. Anal..

[23]  B. Plamenevskii,et al.  Elliptic Problems in Domains with Piecewise Smooth Boundaries , 1994 .

[24]  Ivo Babuška,et al.  On principles for the selection of shape functions for the Generalized Finite Element Method , 2002 .

[25]  J. E. Lewis,et al.  Pseudodifferential operators of mellin type , 1983 .

[26]  Victor Nistor,et al.  LNG_FEM: Generating graded meshes and solving elliptic equations on 2-D domains of polygonal structures , 2007 .

[27]  Boniface Nkemzi The Poisson equation in axisymmetric domains with conical points , 2005 .

[28]  Christine Bernardi,et al.  Weighted Clément operator and application to the finite element discretization of the axisymmetric Stokes problem , 2006, Numerische Mathematik.

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

[30]  Victor Nistor,et al.  Analysis of a modified Schrödinger operator in 2D: Regularity, index, and FEM , 2009 .

[31]  Young-Ju Lee,et al.  On Stability, Accuracy, and Fast Solvers for Finite Element Approximations of the Axisymmetric Stokes Problem by Hood-Taylor Elements , 2011, SIAM J. Numer. Anal..

[32]  S. Nicaise,et al.  The finite element method with anisotropic mesh grading for elliptic problems in domains with corners and edges , 1998 .

[33]  Serge Nicaise,et al.  Regularity of the solutions of elliptic systems in polyhedral domains. , 1997 .

[34]  Hengguang Li,et al.  A-priori analysis and the finite element method for a class of degenerate elliptic equations , 2008, Math. Comput..

[35]  I. Babuška,et al.  Direct and inverse error estimates for finite elements with mesh refinements , 1979 .

[36]  Ludmil T. Zikatanov,et al.  Uniform convergence of the multigrid V-cycle on graded meshes for corner singularities , 2008, Numer. Linear Algebra Appl..

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

[38]  Ricardo H. Nochetto,et al.  Data Oscillation and Convergence of Adaptive FEM , 2000, SIAM J. Numer. Anal..

[39]  Seng-Kee Chua,et al.  On Weighted Sobolev Spaces , 1996, Canadian Journal of Mathematics.

[40]  Susanne C. Brenner,et al.  Multigrid methods for the computation of singular solutions and stress intensity factors I: Corner singularities , 1999, Math. Comput..

[41]  Ludmil T. Zikatanov,et al.  Improving the Rate of Convergence of High-Order Finite Elements on Polyhedra I: A Priori Estimates , 2005 .

[42]  C. Schwab,et al.  EXPONENTIAL CONVERGENCE OF hp-FEM FOR MAXWELL EQUATIONS WITH WEIGHTED REGULARIZATION IN POLYGONAL DOMAINS , 2005 .

[43]  Joseph E. Pasciak,et al.  A mixed method for axisymmetric div-curl systems , 2008, Math. Comput..

[44]  Ludmil T. Zikatanov,et al.  Improving the Rate of Convergence of High-Order Finite Elements on Polyhedra II: Mesh Refinements and Interpolation , 2007 .

[45]  Susanne C. Brenner,et al.  Convergence of the multigrid V-cycle algorithm for second-order boundary value problems without full elliptic regularity , 2002, Math. Comput..

[46]  J. Roßmann,et al.  Elliptic Boundary Value Problems in Domains with Point Singularities , 2002 .

[47]  E. N. Dancer ELLIPTIC PROBLEMS IN DOMAINS WITH PIECEWISE SMOOTH BOUNDARIES (de Gruyter Expositions in Mathematics 13) , 1996 .

[48]  Martin Costabel,et al.  Weighted regularization of Maxwell equations in polyhedral domains , 2002, Numerische Mathematik.

[49]  L. R. Scott,et al.  The Mathematical Theory of Finite Element Methods , 1994 .

[50]  P. Grisvard Singularities in Boundary Value Problems , 1992 .

[51]  Serge Nicaise,et al.  Coefficients of the singularities for elliptic boundary value problems on domains with conical points. III: finite element methods on polygonal domains , 1992 .

[52]  Vladimir Maz’ya,et al.  Weighted Lp estimates of solutions to boundary value problems for second order elliptic systems in polyhedral domains , 2003 .

[53]  M. Dauge Elliptic Boundary Value Problems on Corner Domains: Smoothness and Asymptotics of Solutions , 1988 .

[54]  Ricardo H. Nochetto,et al.  Convergence of Adaptive Finite Element Methods , 2002, SIAM Rev..

[55]  M. Dauge Elliptic boundary value problems on corner domains , 1988 .