An unfitted interface penalty method for the numerical approximation of contrast problems

We aim to approximate contrast problems by means of a numerical scheme which does not require that the computational mesh conforms with the discontinuity between coefficients. We focus on the approximation of diffusion-reaction equations in the framework of finite elements. In order to improve the unsatisfactory behavior of Lagrangian elements for this particular problem, we resort to an enriched approximation space, which involves elements cut by the interface. Firstly, we analyze the H^1-stability of the finite element space with respect to the position of the interface. This analysis, applied to the conditioning of the discrete system of equations, shows that the scheme may be ill posed for some configurations of the interface. Secondly, we propose a stabilization strategy, based on a scaling technique, which restores the standard properties of a Lagrangian finite element space and results to be very easily implemented. We also address the behavior of the scheme with respect to large contrast problems ending up with a choice of Nitsche@?s penalty terms such that the extended finite element scheme with penalty is robust for the worst case among small sub-elements and large contrast problems. The theoretical results are finally illustrated by means of numerical experiments.

[1]  Peter Hansbo,et al.  Fictitious domain finite element methods using cut elements: I. A stabilized Lagrange multiplier method , 2010 .

[2]  M. Dryja On Discontinuous Galerkin Methods for Elliptic Problems with Discontinuous Coefficients , 2003 .

[3]  Ted Belytschko,et al.  An extended finite element method for modeling crack growth with frictional contact , 2001 .

[4]  Maksymilian Dryja On discontinuos Galerkin methods for elliptic problems with discontinuous coefficints , 2003 .

[5]  A. Reusken Analysis of an extended pressure finite element space for two-phase incompressible flows , 2008 .

[6]  P. Hansbo,et al.  A finite element method for the simulation of strong and weak discontinuities in solid mechanics , 2004 .

[7]  Ramon Codina,et al.  Approximate imposition of boundary conditions in immersed boundary methods , 2009 .

[8]  Bertrand Maury Numerical Analysis of a Finite Element/Volume Penalty Method , 2009, SIAM J. Numer. Anal..

[9]  J. Craggs Applied Mathematical Sciences , 1973 .

[10]  Erik Burman,et al.  A Domain Decomposition Method Based on Weighted Interior Penalties for Advection-Diffusion-Reaction Problems , 2006, SIAM J. Numer. Anal..

[11]  Arnold Reusken,et al.  An extended pressure finite element space for two-phase incompressible flows with surface tension , 2007, J. Comput. Phys..

[12]  Erik Burman,et al.  Numerical Approximation of Large Contrast Problems with the Unfitted Nitsche Method , 2011 .

[13]  Isaac Harari,et al.  Analysis of an efficient finite element method for embedded interface problems , 2010 .

[14]  G. Strang,et al.  An Analysis of the Finite Element Method , 1974 .

[15]  J. Guermond,et al.  Theory and practice of finite elements , 2004 .

[16]  Isaac Harari,et al.  An efficient finite element method for embedded interface problems , 2009 .

[17]  Wolfgang A. Wall,et al.  An embedded Dirichlet formulation for 3D continua , 2010 .

[18]  P. Hansbo,et al.  Fictitious domain finite element methods using cut elements , 2012 .

[19]  P. Hansbo,et al.  An unfitted finite element method, based on Nitsche's method, for elliptic interface problems , 2002 .

[20]  C. D'Angelo,et al.  A mixed finite element method for Darcy flow in fractured porous media with non-matching grids , 2012 .

[21]  Nicolas Moës,et al.  Imposing Dirichlet boundary conditions in the extended finite element method , 2006 .