Adaptive Finite Element Methods for Elliptic PDEs Based on Conforming Centroidal Voronoi–Delaunay Triangulations

Ju, Lili; Gunzburger, Max; Zhao, Weidong

doi:10.1137/050643568

Cited by 40 publications

(53 citation statements)

References 28 publications

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“…For one thing, through a point density function, CVT grid generation methodologies allow for a simple means of controlling the local grid size; moreover, the density function can easily be connected to error estimators, resulting in effective adaptive refinement strategies (Ju et al, 2002b). For another thing, CVTbased grids feature smooth transitions from coarse to fine grids; see Section 4.1.2 for an illustration.…”

Section: Centroidal Voronoi Tessellationsmentioning

confidence: 99%

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Voronoi Tessellations and Their Application to Climate and Global Modeling

Ringler

Gunzburger

2011

Lecture Notes in Computational Science and Engineering

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We review the use of Voronoi tessellations for grid generation, especially on the whole sphere or in regions on the sphere. Voronoi tessellations and the corresponding Delaunay tessellations in regions and surfaces on Euclidean space are defined and properties they possess that make them well-suited for grid generation purposes are discussed, as are algorithms for their construction. This is followed by a more detailed look at one very special type of Voronoi tessellation, the centroidal Voronoi tessellation (CVT). After defining them, discussing some of their properties, and presenting algorithms for their construction, we illustrate the use of CVTs for producing both quasi-uniform and variable resolution meshes in the plane and on the sphere. Finally, we briefly discuss the computational solution of model equations based on CVTs on the sphere.

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Section: Centroidal Voronoi Tessellationsmentioning

confidence: 99%

“…The relation (9) between the density function and the local mesh sizes is also very useful in CVT-based adaptive mesh generation and optimization (Ju, 2007;Ju et al, 2002b).…”

Section: The Relation Between the Density Function And The Local Meshmentioning

confidence: 99%

Voronoi Tessellations and Their Application to Climate and Global Modeling

Ringler

Gunzburger

2011

Lecture Notes in Computational Science and Engineering

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“…We remark that (4.1) is still a conjecture in spaces with d ≥ 2 but has been numerically verified by extensive experiments and is widely assumed in practical applications such as vector quantization and image processing [58]. The main idea of CVT/CVDT based adaptive algorithms is to first refine the old mesh and then optimize the mesh using the CVT/CVDT algorithms according to either the solution norms given in [32] or some other local a posteriori error estimators [67,70]. One can explicitly determine a density function ρ based on some a posteriori error estimator and the CVT mesh size relation (4.1) to generate the new mesh so that the errors of the new approximate solution will be equally distributed over the element in an optimal way [32,67,70].…”

Section: Cvt-based Adaptive Algorithms For Numerical Pdesmentioning

confidence: 99%

“…In [68,70], the concept of conforming CVT/CVDT was proposed with regard to these constraints which further elaborated the mixed energy minimization formulation given in [32]. Assume that the domain Ω is compact and ∂ Ω is piecewise smooth with singular/corner points…”

Section: Mesh Generation and Optimizationmentioning

confidence: 99%

“…A special lifting process [68,70] is added during the Lloyd iteration that allows the boundary generators to return to the interior domain together with the projection process so that the number of boundary generators can vary freely according to the density function. Thus the dependence of resulting CfCVDT meshes on the initial guess is greatly weakened.…”

Section: The Dual Triangulation Is Called a Conforming Centroidal Vormentioning

confidence: 99%

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Advances in Studies and Applications of Centroidal Voronoi Tessellations

Du¹,

Gunzburger²,

Ju³

2010

NMTMA

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Abstract. Centroidal Voronoi tessellations (CVTs) have become a useful tool in many applications ranging from geometric modeling, image and data analysis, and numerical partial differential equations, to problems in physics, astrophysics, chemistry, and biology. In this paper, we briefly review the CVT concept and a few of its generalizations and well-known properties. We then present an overview of recent advances in both mathematical and computational studies and in practical applications of CVTs. Whenever possible, we point out some outstanding issues that still need investigating.

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Numerical simulations of the steady Navier–Stokes equations using adaptive meshing schemes

Lee

2007

Numerical Methods in Fluids

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SUMMARYIn this paper, we consider an adaptive meshing scheme for solution of the steady incompressible NavierStokes equations by finite element discretization. The mesh refinement and optimization are performed based on an algorithm that combines the so-called conforming centroidal Voronoi Delaunay triangulations (CfCVDTs) and residual-type local a posteriori error estimators. Numerical experiments in the twodimensional space for various examples are presented with quadratic finite elements used for the velocity field and linear finite elements for the pressure. The results show that our meshing scheme can equally distribute the errors over all elements in some optimal way and keep the triangles very well shaped as well at all levels of refinement. In addition, the convergence rates achieved are close to the best obtainable. Extension of this approach to three-dimensional cases is also discussed and the main challenge is the efficient implementation of three-dimensional CfCVDT generation that is still under development.

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Adaptive Finite Element Methods for Elliptic PDEs Based on Conforming Centroidal Voronoi–Delaunay Triangulations

Cited by 40 publications

References 28 publications

Voronoi Tessellations and Their Application to Climate and Global Modeling

Voronoi Tessellations and Their Application to Climate and Global Modeling

Advances in Studies and Applications of Centroidal Voronoi Tessellations

Numerical simulations of the steady Navier–Stokes equations using adaptive meshing schemes

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