An h-narrow band finite-element method for elliptic equations on implicit surfaces

In this article we define a finite-element method for elliptic partial differential equations (PDEs) on curves or surfaces, which are given implicitly by some level set function. The method is specially designed for complicated surfaces. The key idea is to solve the PDE on a narrow band around the surface. The width of the band is proportional to the grid size. We use finite-element spaces that are unfitted to the narrow band, so that elements are cut off. The implementation nevertheless is easy. We prove error estimates of optimal order for a Poisson equation on a surface and provide numerical tests and examples.

[1]  Guillermo Sapiro,et al.  Fourth order partial differential equations on general geometries , 2006, J. Comput. Phys..

[2]  Charles M. Elliott,et al.  Eulerian finite element method for parabolic PDEs on implicit surfaces , 2008 .

[3]  C. M. Elliott,et al.  Fitted and Unfitted Finite-Element Methods for Elliptic Equations with Smooth Interfaces , 1987 .

[4]  Kunibert G. Siebert,et al.  Design of Adaptive Finite Element Software - The Finite Element Toolbox ALBERTA , 2005, Lecture Notes in Computational Science and Engineering.

[5]  John B. Greer,et al.  An Improvement of a Recent Eulerian Method for Solving PDEs on General Geometries , 2006, J. Sci. Comput..

[6]  M. Burger Finite element approximation of elliptic partial differential equations on implicit surfaces , 2009 .

[7]  Thierry Aubin,et al.  Nonlinear analysis on manifolds, Monge-Ampère equations , 1982 .

[8]  G. Dziuk Finite Elements for the Beltrami operator on arbitrary surfaces , 1988 .

[9]  Hongkai Zhao,et al.  An Eulerian Formulation for Solving Partial Differential Equations Along a Moving Interface , 2003, J. Sci. Comput..

[10]  C. M. Elliott,et al.  An Eulerian level set method for partial differential equations on evolving surfaces , 2007 .

[11]  John W. Barrett,et al.  Finite-Element Approximation of Elliptic Equations with a Neumann or Robin Condition on a Curved Boundary , 1988 .

[12]  Charles M. Elliott,et al.  Finite elements on evolving surfaces , 2007 .

[13]  J. Sethian,et al.  Transport and diffusion of material quantities on propagating interfaces via level set methods , 2003 .

[14]  C. M. Elliott,et al.  Surface Finite Elements for Parabolic Equations , 2007 .

[15]  D. Gilbarg,et al.  Elliptic Partial Differential Equa-tions of Second Order , 1977 .

[16]  Guillermo Sapiro,et al.  Variational Problems and Partial Differential Equations on Implicit Surfaces: Bye Bye Triangulated Surfaces? , 2003 .

[17]  Alan Demlow,et al.  An Adaptive Finite Element Method for the Laplace-Beltrami Operator on Implicitly Defined Surfaces , 2007, SIAM J. Numer. Anal..

[18]  Jeremy Brandman A Level-Set Method for Computing the Eigenvalues of Elliptic Operators Defined on Compact Hypersurfaces , 2008, J. Sci. Comput..

[19]  C. M. Elliott,et al.  A Finite-element Method for Solving Elliptic Equations with Neumann Data on a Curved Boundary Using Unfitted Meshes , 1984 .