A coupling technique for non-matching finite element meshes

This paper presents a novel technique for coupling non-matching finite element meshes, based on the use of special finite elements termed coupling finite elements (CFEs), which share nodes with non-matching meshes. The main features of the proposed technique are: (i) no additional degree of freedom is introduced to the problem; (ii) non-rigid coupling can be considered to describe the nonlinear behavior of interfaces similar to cohesive models; (iii) non-matching meshes of any dimension and any type of finite elements can be coupled, and (iv) overlapping and non-overlapping meshes can be considered. The applicability of the proposed technique is illustrated by a variety of 2D and 3D examples with different non-matching mesh configurations. The results demonstrate that the technique is able to enforce the continuity of displacements in the case of rigid coupling, and to properly transfer the interaction forces across the non-matching interfaces, according to any chosen interface model, in the case of non-rigid coupling.

[1]  Pierre Kerfriden,et al.  Nitsche's method method for mixed dimensional analysis: conforming and non-conforming continuum-beam and continuum-plate coupling , 2013, 1308.2910.

[2]  Jörg F. Unger,et al.  Multiscale Modeling of Concrete , 2011 .

[3]  Jae Hyuk Lim,et al.  Variable‐node elements for non‐matching meshes by means of MLS (moving least‐square) scheme , 2007 .

[4]  Daniel Rixen,et al.  On micro-to-macro connections in domain decomposition multiscale methods , 2012 .

[5]  Hyun Gyu Kim Interface element method: Treatment of non-matching nodes at the ends of interfaces between partitioned domains , 2003 .

[6]  Yuri Bazilevs,et al.  Isogeometric fluid–structure interaction analysis with emphasis on non-matching discretizations, and with application to wind turbines , 2012 .

[7]  Carlos E. S. Cesnik,et al.  EVALUATION OF SOME DATA TRANSFER ALGORITHMS FOR NONCONTIGUOUS MESHES , 2000 .

[8]  Steffen Marburg,et al.  Structural‐acoustic coupling on non‐conforming meshes with quadratic shape functions , 2012 .

[9]  Osvaldo L. Manzoli,et al.  Modeling of interfaces in two-dimensional problems using solid finite elements with high aspect ratio , 2012 .

[10]  Jae Hyuk Lim,et al.  An efficient scheme for coupling dissimilar hexahedral meshes with the aid of variable-node transition elements , 2013, Adv. Eng. Softw..

[11]  Barbara I. Wohlmuth,et al.  Mortar Finite Elements for Interface Problems , 2004, Computing.

[12]  S. Im,et al.  MLS‐based variable‐node elements compatible with quadratic interpolation. Part II: application for finite crack element , 2006 .

[13]  K. Y. Sze,et al.  Two‐ and three‐dimensional transition element families for adaptive refinement analysis of elasticity problems , 2009 .

[14]  F. Magoules Mesh Partitioning Techniques and Domain Decomposition Methods , 2008 .

[15]  Raphael T. Haftka,et al.  Stiffness-matrix condition number and shape sensitivity errors , 1990 .

[16]  K. Y. Sze,et al.  Adaptive meshing and analysis using transitional quadrilateral and hexahedral elements , 2010 .

[17]  Comite Euro-International du Beton,et al.  CEB-FIP Model Code 1990 , 1993 .

[18]  Senganal Thirunavukkarasu,et al.  A domain decomposition method for concurrent coupling of multiscale models , 2012 .

[19]  Guillaume Rateau,et al.  The Arlequin method as a flexible engineering design tool , 2005 .

[20]  J. Nitsche Über ein Variationsprinzip zur Lösung von Dirichlet-Problemen bei Verwendung von Teilräumen, die keinen Randbedingungen unterworfen sind , 1971 .

[21]  Hester Bijl,et al.  Review of coupling methods for non-matching meshes , 2007 .

[22]  Rainald Löhner,et al.  Conservative load projection and tracking for fluid-structure problems , 1996 .

[23]  Douglas N. Arnold,et al.  Unified Analysis of Discontinuous Galerkin Methods for Elliptic Problems , 2001, SIAM J. Numer. Anal..

[24]  C. Douglas,et al.  Condition number estimates for matrices arising in NURBS based isogeometric discretizations of elliptic partial differential equations , 2014, 1406.6808.

[25]  G. Carey,et al.  On penalty methods for interelement constraints , 1982 .

[26]  Michael A. Puso,et al.  An embedded mesh method for treating overlapping finite element meshes , 2011 .

[27]  H. Dhia Problèmes mécaniques multi-échelles: la méthode Arlequin , 1998 .

[28]  M. Unser,et al.  Interpolation revisited [medical images application] , 2000, IEEE Transactions on Medical Imaging.

[29]  Jae Hyuk Lim,et al.  Variable-node finite elements with smoothed integration techniques and their applications for multiscale mechanics problems , 2010 .

[30]  Ronald C. Averill,et al.  A penalty-based interface technology for coupling independently modeled 3D finite element meshes , 2007 .

[31]  Francesco Caputo,et al.  Methodological Approaches for Kinematic Coupling of non-matching Finite Element meshes , 2011 .

[32]  Barbara Wohlmuth,et al.  Thermo-mechanical contact problems on non-matching meshes , 2009 .

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

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

[35]  Tod A. Laursen,et al.  A finite element formulation for rod/continuum interactions: The one-dimensional slideline , 1994 .

[36]  Barbara I. Wohlmuth,et al.  A Mortar Finite Element Method Using Dual Spaces for the Lagrange Multiplier , 2000, SIAM J. Numer. Anal..

[37]  S. Im,et al.  Variable-node element families for mesh connection and adaptive mesh computation , 2012 .

[38]  K. D. Hjelmstad,et al.  An enriched discontinuous Galerkin formulation for the coupling of non-conforming meshes , 2010 .

[39]  Hyun Gyu Kim Development of three-dimensional interface elements for coupling of non-matching hexahedral meshes , 2008 .

[40]  Eric Boillat,et al.  Finite element methods on non-conforming grids by penalizing the matching constraint , 2003 .

[41]  David Dureisseix,et al.  Information transfer between incompatible finite element meshes: Application to coupled thermo-viscoelasticity , 2006 .

[42]  Hyun Gyu Kim Interface element method (IEM) for a partitioned system with non-matching interfaces , 2002 .

[43]  C. Miehe,et al.  Computational micro-to-macro transitions of discretized microstructures undergoing small strains , 2002 .

[44]  Ronald C. Averill,et al.  A penalty-based finite element interface technology , 2002 .