Clustered generalized finite element methods for mesh unrefinement, non‐matching and invalid meshes

In spite of significant advancements in automatic mesh generation during the past decade, the construction of quality finite element discretizations on complex three-dimensional domains is still a difficult and time demanding task. In this paper, the partition of unity framework used in the generalized finite element method (GFEM) is exploited to create a very robust and flexible method capable of using meshes that are unacceptable for the finite element method, while retaining its accuracy and computational efficiency. This is accomplished not by changing the mesh but instead by clustering groups of nodes and elements. The clusters define a modified finite element partition of unity that is constant over part of the clusters. This so-called clustered partition of unity is then enriched to the desired order using the framework of the GFEM. The proposed generalized finite element method can correctly and efficiently deal with: (i) elements with negative Jacobian; (ii) excessively fine meshes created by automatic mesh generators; (iii) meshes consisting of several sub-domains with non-matching interfaces. Under such relaxed requirements for an acceptable mesh, and for correctly defined geometries, today's automated tetrahedral mesh generators can practically guarantee successful volume meshing that can be entirely hidden from the user. A detailed technical discussion of the proposed generalized finite element method with clustering along with numerical experiments and some implementation details are presented. Copyright © 2006 John Wiley & Sons, Ltd.

[1]  Bodo Heise Analysis of a fully discrete finite element method for a nonlinear magnetic field problem , 1994 .

[2]  Clark R. Dohrmann,et al.  Methods for connecting dissimilar three-dimensional finite element meshes , 2000 .

[3]  J. Monaghan,et al.  Kernel estimates as a basis for general particle methods in hydrodynamics , 1982 .

[4]  Ivo Babuška,et al.  Generalized finite element methods for three-dimensional structural mechanics problems , 2000 .

[5]  Ted Belytschko,et al.  A coupled finite element-element-free Galerkin method , 1995 .

[6]  Huafeng Liu,et al.  Meshfree particle method , 2003, Proceedings Ninth IEEE International Conference on Computer Vision.

[7]  The FDM in arbitrary curvilinear co-ordinates—formulation, numerical approach and applications , 1989 .

[8]  J. Oden,et al.  A Posteriori Error Estimation in Finite Element Analysis , 2000 .

[9]  T. Belytschko,et al.  Crack propagation by element-free Galerkin methods , 1995 .

[10]  J. Oden,et al.  H‐p clouds—an h‐p meshless method , 1996 .

[11]  Clark R. Dohrmann,et al.  A method for connecting dissimilar finite element meshes in two dimensions , 2000 .

[12]  Michael Griebel,et al.  Meshfree Methods for Partial Differential Equations IV , 2005 .

[13]  H. Saunders,et al.  Finite element procedures in engineering analysis , 1982 .

[14]  O. C. Zienkiewicz,et al.  The Finite Element Method: Its Basis and Fundamentals , 2005 .

[15]  Ted Belytschko,et al.  Discontinuous enrichment in finite elements with a partition of unity method , 2000 .

[16]  T. Liszka,et al.  A generalized finite element method for the simulation of three-dimensional dynamic crack propagation , 2001 .

[17]  Michael Griebel,et al.  A Particle-Partition of Unity Method-Part III: A Multilevel Solver , 2002, SIAM J. Sci. Comput..

[18]  Á. D. L. Hoz,et al.  The fractal behaviour of triangular refined/derefined meshes , 1996 .

[19]  I. Babuska,et al.  Finite Element Analysis , 2021 .

[20]  I. Babuska,et al.  The partition of unity finite element method , 1996 .

[21]  T. Belytschko,et al.  THE NATURAL ELEMENT METHOD IN SOLID MECHANICS , 1998 .

[22]  I. Babuska,et al.  The Partition of Unity Method , 1997 .

[23]  Todd Arbogast,et al.  A non-mortar mixed finite element method for elliptic problems on non-matching multiblock grids☆ , 1997 .

[24]  B. Nayroles,et al.  Generalizing the finite element method: Diffuse approximation and diffuse elements , 1992 .

[25]  Wing Kam Liu,et al.  Reproducing kernel particle methods , 1995 .

[26]  Ted Belytschko,et al.  Arbitrary discontinuities in finite elements , 2001 .

[27]  John E. Osborn,et al.  Superconvergence in the generalized finite element method , 2007, Numerische Mathematik.

[28]  Michael Griebel,et al.  A Particle-Partition of Unity Method for the Solution of Elliptic, Parabolic, and Hyperbolic PDEs , 2000, SIAM J. Sci. Comput..

[29]  Barbara Wohlmuth,et al.  A new dual mortar method for curved interfaces: 2D elasticity , 2005 .

[30]  I. Babuska The finite element method with Lagrangian multipliers , 1973 .

[31]  Jinchao Xu,et al.  A conforming finite element method for overlapping and nonmatching grids , 2003, Math. Comput..

[32]  S. Im,et al.  MLS‐based variable‐node elements compatible with quadratic interpolation. Part I: formulation and application for non‐matching meshes , 2006 .

[33]  Somnath Ghosh,et al.  Three dimensional Voronoi cell finite element model for microstructures with ellipsoidal heterogeneties , 2004 .

[34]  I. Yotov,et al.  Mixed Finite Element Methods on Non-Matching Multiblock Grids , 1996 .

[35]  Hans Sagan Peano’s Space-Filling Curve , 1994 .

[36]  T. Belytschko,et al.  Extended finite element method for three-dimensional crack modelling , 2000 .

[37]  Huafeng Liu,et al.  Meshfree Particle Methods , 2004 .

[38]  T. Belytschko,et al.  Element‐free Galerkin methods , 1994 .

[39]  Somnath Ghosh,et al.  Multiple scale analysis of heterogeneous elastic structures using homogenization theory and voronoi cell finite element method , 1995 .

[40]  P. Lancaster,et al.  Surfaces generated by moving least squares methods , 1981 .

[41]  S. Atluri,et al.  A new Meshless Local Petrov-Galerkin (MLPG) approach in computational mechanics , 1998 .

[42]  T. Liszka,et al.  The Generalized Finite Element Method-Improving Finite Elements Through Meshless Technology , 2005 .

[43]  J. Tinsley Oden,et al.  An hp Adaptive Method Using Clouds C , 2006 .

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

[45]  T. Belytschko,et al.  MODELING HOLES AND INCLUSIONS BY LEVEL SETS IN THE EXTENDED FINITE-ELEMENT METHOD , 2001 .

[46]  Michael Griebel,et al.  A Particle-Partition of Unity Method-Part II: Efficient Cover Construction and Reliable Integration , 2001, SIAM J. Sci. Comput..

[47]  T. Belytschko,et al.  Arbitrary branched and intersecting cracks with the eXtended Finite Element Method , 2000 .

[48]  Jiun-Shyan Chen,et al.  Large deformation analysis of rubber based on a reproducing kernel particle method , 1997 .

[49]  Jiun-Shyan Chen,et al.  A stabilized conforming nodal integration for Galerkin mesh-free methods , 2001 .

[50]  Michael Griebel,et al.  Meshfree Methods for Partial Differential Equations , 2002 .

[51]  Hyun Gyu Kim,et al.  An improved interface element with variable nodes for non-matching finite element meshes , 2005 .

[52]  I. Babuska,et al.  Special finite element methods for a class of second order elliptic problems with rough coefficients , 1994 .

[53]  Peter Hansbo,et al.  Nitsche's method for coupling non-matching meshes in fluid-structure vibration problems , 2003 .

[54]  T. Strouboulis,et al.  The generalized finite element method: an example of its implementation and illustration of its performance , 2000 .

[55]  O. C. Zienkiewicz,et al.  A new cloud-based hp finite element method , 1998 .

[56]  Wing Kam Liu,et al.  Wavelet and multiple scale reproducing kernel methods , 1995 .

[57]  Nitin V. Hattangady,et al.  Coarsening of mesh models for representation of rigid objects in finite element analysis , 1999 .

[58]  G. R. Liu,et al.  1013 Mesh Free Methods : Moving beyond the Finite Element Method , 2003 .

[59]  I. Babuška,et al.  Mesh-independent directional p-enrichment using the generalized finite element method , 2001 .

[60]  Todd Arbogast,et al.  Mixed Finite Element Methods on Nonmatching Multiblock Grids , 2000, SIAM J. Numer. Anal..

[61]  I. Babuska,et al.  The finite element method and its reliability , 2001 .

[62]  Mark A Fleming,et al.  Meshless methods: An overview and recent developments , 1996 .

[63]  André Vinicius Celani Duarte,et al.  A discontinuous finite element-based domain decomposition method , 2000 .

[64]  Barbara Wohlmuth A COMPARISON OF DUAL LAGRANGE MULTIPLIER SPACES FOR MORTAR FINITE ELEMENT DISCRETIZATIONS , 2002 .

[65]  E. Oñate,et al.  A stabilized finite point method for analysis of fluid mechanics problems , 1996 .

[66]  I. Babuska,et al.  The design and analysis of the Generalized Finite Element Method , 2000 .

[67]  O. C. Zienkiewicz,et al.  Finite point methods in computational mechanics , 1995 .

[68]  Martin W. Heinstein,et al.  An analysis of smoothed particle hydrodynamics , 1994 .

[69]  I. Babuska,et al.  The partition of unity finite element method: Basic theory and applications , 1996 .

[70]  Ivo Babuška,et al.  Mesh‐independent p‐orthotropic enrichment using the generalized finite element method , 2002 .

[71]  Ted Belytschko,et al.  Overview and applications of the reproducing Kernel Particle methods , 1996 .

[72]  S. Attaway,et al.  Smoothed particle hydrodynamics stability analysis , 1995 .

[73]  C. Bernardi,et al.  A New Nonconforming Approach to Domain Decomposition : The Mortar Element Method , 1994 .

[74]  T. Liszka,et al.  The finite difference method at arbitrary irregular grids and its application in applied mechanics , 1980 .

[75]  Eugenio Oñate,et al.  A mesh-free finite point method for advective-diffusive transport and fluid flow problems , 1998 .

[76]  Wing Kam Liu,et al.  Reproducing Kernel Particle Methods for large deformation analysis of non-linear structures , 1996 .

[77]  P. Hansbo,et al.  A finite element method for domain decomposition with non-matching grids , 2003 .

[78]  J. Altenbach Zienkiewicz, O. C., The Finite Element Method. 3. Edition. London. McGraw‐Hill Book Company (UK) Limited. 1977. XV, 787 S. , 1980 .

[79]  K. Bathe,et al.  The method of finite spheres , 2000 .

[80]  Genki Yagawa,et al.  Generalized nodes and high‐performance elements , 2005 .

[81]  C. Felippa,et al.  A simple algorithm for localized construction of non‐matching structural interfaces , 2002 .

[82]  C. Bacuta,et al.  PARTITION OF UNITY FOR THE STOKES PROBLEM ON NONMATCHING GRIDS , 2022 .

[83]  Roland Glowinski,et al.  An introduction to the mathematical theory of finite elements , 1976 .

[84]  D. Sulsky,et al.  A particle method for history-dependent materials , 1993 .

[85]  Analysis of large deformations of membrane shells by the generalized finite difference method , 1987 .

[86]  Ted Belytschko,et al.  A finite element method for crack growth without remeshing , 1999 .