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Journal of Scientific Computing

Erschienen in:

19.10.2015

Preconditioning for Radial Basis Function Partition of Unity Methods

verfasst von: Alfa Heryudono, Elisabeth Larsson, Alison Ramage, Lina von Sydow

Erschienen in: Journal of Scientific Computing | Ausgabe 3/2016

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Abstract

Meshfree radial basis function (RBF) methods are of interest for solving partial differential equations due to attractive convergence properties, flexibility with respect to geometry, and ease of implementation. For global RBF methods, the computational cost grows rapidly with dimension and problem size, so localised approaches, such as partition of unity or stencil based RBF methods, are currently being developed. An RBF partition of unity method (RBF–PUM) approximates functions through a combination of local RBF approximations. The linear systems that arise are locally unstructured, but with a global structure due to the partitioning of the domain. Due to the sparsity of the matrices, for large scale problems, iterative solution methods are needed both for computational reasons and to reduce memory requirements. In this paper we implement and test different algebraic preconditioning strategies based on the structure of the matrix in combination with incomplete factorisations. We compare their performance for different orderings and problem settings and find that a no-fill incomplete factorisation of the central band of the original discretisation matrix provides a robust and efficient preconditioner.

Vorheriger Artikel Parametrized Positivity Preserving Flux Limiters for the High Order Finite Difference WENO Scheme Solving Compressible Euler Equations

Nächster Artikel Legendre Spectral Collocation Methods for Volterra Delay-Integro-Differential Equations

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Axelsson, O., Neytcheva, M., Ahmad, B.: A comparison of iterative methods to solve complex valued linear algebraic systems. Numer. Algorithms 66(4), 811–841 (2014). doi:10.1007/s11075-013-9764-1 MathSciNetCrossRefMATH

Babuška, I., Melenk, J.M.: The partition of unity method. Int. J. Numer. Methods Eng. 40(4), 727–758 (1997). doi:10.1002/(SICI)1097-0207(19970228)40:4<727::AID-NME86>3.0.CO;2-N

Baxter, B.J.C.: Preconditioned conjugate gradients, radial basis functions, and Toeplitz matrices. Comput. Math. Appl. 43(3–5), 305–318 (2002). doi:10.1016/S0898-1221(01)00288-7 MathSciNetCrossRefMATH

Beatson, R.K., Cherrie, J.B., Mouat, C.T.: Fast fitting of radial basis functions: methods based on preconditioned GMRES iteration. Adv. Comput. Math. 11(2–3), 253–270 (1999). doi:10.1023/A:1018932227617 MathSciNetCrossRefMATH

Beatson, R.K., Light, W.A., Billings, S.: Fast solution of the radial basis function interpolation equations: domain decomposition methods. SIAM J. Sci. Comput. 22(5), 1717–1740 (2000). doi:10.1137/S1064827599361771 MathSciNetCrossRefMATH

Benzi, M.: Preconditioning techniques for large linear systems: a survey. J. Comp. Phys. 182, 418–477 (2002). doi:10.1006/jcph.2002.7176 MathSciNetCrossRefMATH

Brown, D., Ling, L., Kansa, E., Levesley, J.: On approximate cardinal preconditioning methods for solving PDEs with radial basis functions. Eng. Anal. Bound. Elem. 29(4), 343–353 (2005). doi:10.1016/j.enganabound.2004.05.006 CrossRefMATH

Cavoretto, R., De Rossi, A.: Spherical interpolation using the partition of unity method: an efficient and flexible algorithm. Appl. Math. Lett. 25(10), 1251–1256 (2012). doi:10.1016/j.aml.2011.11.006 MathSciNetCrossRefMATH

Cavoretto, R., De Rossi, A.: A meshless interpolation algorithm using a cell-based searching procedure. Comput. Math. Appl. 67(5), 1024–1038 (2014). doi:10.1016/j.camwa.2014.01.007 MathSciNetCrossRef

10.

Cavoretto, R., De Rossi, A.: A trivariate interpolation algorithm using a cube-partition searching procedure. arXiv:1409.5423 [math.NA] (2014)

11.

Cavoretto, R., De Rossi, A., Donatelli, M., Serra-Capizzano, S.: Spectral analysis and preconditioning techniques for radial basis function collocation matrices. Numer. Linear Algebra Appl. 19(1), 31–52 (2012). doi:10.1002/nla.774 MathSciNetCrossRefMATH

12.

De Marchi, S., Santin, G.: Fast computation of orthonormal basis for RBF spaces through Krylov space methods. BIT, pp. 1–18 (2014). doi:10.1007/s10543-014-0537-6

13.

Deng, Q., Driscoll, T.A.: A fast treecode for multiquadric interpolation with varying shape parameters. SIAM J. Sci. Comput. 34(2), A1126–A1140 (2012). doi:10.1137/110836225 MathSciNetCrossRefMATH

14.

Driscoll, T.A., Fornberg, B.: Interpolation in the limit of increasingly flat radial basis functions. Comput. Math. Appl. 43(3–5), 413–422 (2002). doi:10.1016/S0898-1221(01)00295-4 MathSciNetCrossRefMATH

15.

Driscoll, T.A., Toh, K.C., Trefethen, L.N.: From potential theory to matrix iterations in six steps. SIAM Rev. 40, 547–578 (1998). doi:10.1137/S0036144596305582 MathSciNetCrossRefMATH

16.

Embree, M.: How descriptive are GMRES convergence bounds? Tech. Rep. 99/08, Oxford University Computing Laboratory Numerical Analysis (1999)

17.

Farrell, P., Pestana, J.: Block preconditioners for linear systems arising from multiscale collocation with compactly supported RBFs. Numer. Linear Algebra Appl. 22(4), 731–747 (2015). doi:10.1002/nla.1984 MathSciNetCrossRefMATH

18.

Fasshauer, G.E.: Meshfree approximation methods with MATLAB. Interdisciplinary Mathematical Sciences, vol. 6. World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ (2007). doi:10.1142/6437

19.

Fasshauer, G.E., McCourt, M.J.: Stable evaluation of Gaussian radial basis function interpolants. SIAM J. Sci. Comput. 34(2), A737–A762 (2012). doi:10.1137/110824784 MathSciNetCrossRefMATH

20.

Faul, A.C., Goodsell, G., Powell, M.J.D.: A Krylov subspace algorithm for multiquadric interpolation in many dimensions. IMA J. Numer. Anal. 25(1), 1–24 (2005). doi:10.1093/imanum/drh021 MathSciNetCrossRefMATH

21.

Fornberg, B., Larsson, E., Flyer, N.: Stable computations with Gaussian radial basis functions. SIAM J. Sci. Comput. 33(2), 869–892 (2011). doi:10.1137/09076756X MathSciNetCrossRefMATH

22.

Fornberg, B., Lehto, E., Powell, C.: Stable calculation of Gaussian-based RBF-FD stencils. Comput. Math. Appl. 65(4), 627–637 (2013). doi:10.1016/j.camwa.2012.11.006 MathSciNetCrossRefMATH

23.

Fornberg, B., Piret, C.: A stable algorithm for flat radial basis functions on a sphere. SIAM J. Sci. Comput. 30(1), 60–80 (2007). doi:10.1137/060671991 MathSciNetCrossRefMATH

24.

Fornberg, B., Wright, G.: Stable computation of multiquadric interpolants for all values of the shape parameter. Comput. Math. Appl. 48(5–6), 853–867 (2004). doi:10.1016/j.camwa.2003.08.010 MathSciNetCrossRefMATH

25.

Fornberg, B., Wright, G., Larsson, E.: Some observations regarding interpolants in the limit of flat radial basis functions. Comput. Math. Appl. 47(1), 37–55 (2004). doi:10.1016/S0898-1221(04)90004-1 MathSciNetCrossRefMATH

26.

Fornberg, B., Zuev, J.: The Runge phenomenon and spatially variable shape parameters in RBF interpolation. Comput. Math. Appl. 54(3), 379–398 (2007). doi:10.1016/j.camwa.2007.01.028 MathSciNetCrossRefMATH

27.

Fuselier, E., Hangelbroek, T., Narcowich, F.J., Ward, J.D., Wright, G.B.: Localized bases for kernel spaces on the unit sphere. SIAM J. Numer. Anal. 51(5), 2538–2562 (2013). doi:10.1137/120876940 MathSciNetCrossRefMATH

28.

Halton, J.H.: On the efficiency of certain quasi-random sequences of points in evaluating multi-dimensional integrals. Numer. Math. 2, 84–90 (1960). doi:10.1007/BF01386213 MathSciNetCrossRefMATH

29.

Larsson, E., Fornberg, B.: A numerical study of some radial basis function based solution methods for elliptic PDEs. Comput. Math. Appl. 46(5–6), 891–902 (2003). doi:10.1016/S0898-1221(03)90151-9 MathSciNetCrossRefMATH

30.

Larsson, E., Fornberg, B.: Theoretical and computational aspects of multivariate interpolation with increasingly flat radial basis functions. Comput. Math. Appl. 49(1), 103–130 (2005). doi:10.1016/j.camwa.2005.01.010 MathSciNetCrossRefMATH

31.

Larsson, E., Heryudono, A.: A partition of unity radial basis function collocation method for partial differential equations (2015) (in press)

32.

Larsson, E., Lehto, E., Heryudono, A., Fornberg, B.: Stable computation of differentiation matrices and scattered node stencils based on Gaussian radial basis functions. SIAM J. Sci. Comput. 35(4), A2096–A2119 (2013). doi:10.1137/120899108 MathSciNetCrossRefMATH

33.

Liesen, J., Strakos̆, Z.: Krylov subspace methods: principles and analysis. In: Stuart, A.M., Süli, E. (eds.) Numerical Mathematics and Scientific Computation, vol. 25. Oxford University Press, Oxford (2013)

34.

Ling, L., Kansa, E.J.: A least-squares preconditioner for radial basis functions collocation methods. Adv. Comput. Math. 23(1–2), 31–54 (2005). doi:10.1007/s10444-004-1809-5 MathSciNetCrossRefMATH

35.

MATLAB: version 8.3.0.532 (R2014a). The MathWorks Inc., Natick, Massachusetts (2014)

36.

Meijerink, J.A., van der Vorst, H.A.: An iterative solution method for linear systems of which the coefficient matrix is a symmetric M-matrix. Math. Comp. 31, 148–162 (1977). doi:10.1090/S0025-5718-1977-0438681-4 MathSciNetMATH

37.

Müller, S., Schaback, R.: A Newton basis for kernel spaces. J. Approx. Theory 161(2), 645–655 (2009). doi:10.1016/j.jat.2008.10.014 MathSciNetCrossRefMATH

38.

Pazouki, M., Schaback, R.: Bases for kernel-based spaces. J. Comput. Appl. Math. 236(4), 575–588 (2011). doi:10.1016/j.cam.2011.05.021 MathSciNetCrossRefMATH

39.

Rieger, C., Zwicknagl, B.: Sampling inequalities for infinitely smooth functions, with applications to interpolation and machine learning. Adv. Comput. Math. 32(1), 103–129 (2010). doi:10.1007/s10444-008-9089-0 MathSciNetCrossRefMATH

40.

Rieger, C., Zwicknagl, B.: Improved exponential convergence rates by oversampling near the boundary. Constr. Approx. 39(2), 323–341 (2014). doi:10.1007/s00365-013-9211-5 MathSciNetCrossRefMATH

41.

Saad, Y.: Iterative Methods for Sparse Linear Systems. Society for Industrial and Applied Mathematics (2003). doi:10.1137/1.9780898718003

42.

Saad, Y., Schultz, M.H.: GMRES: a generalized minimal residual algorithm for solving nonsymmetric linear systems. SIAM J. Sci. Stat. Comput. 7, 856–869 (1986). doi:10.1137/0907058 MathSciNetCrossRefMATH

43.

Safdari-Vaighani, A., Heryudono, A., Larsson, E.: A radial basis function partition of unity collocation method for convection–diffusion equations arising in financial applications. J. Sci. Comp. 1–27 (2014). doi:10.1007/s10915-014-9935-9

44.

Schoenberg, I.J.: Metric spaces and completely monotone functions. Ann. of Math. (2) 39(4), 811–841 (1938). doi:10.2307/1968466 MathSciNetCrossRefMATH

45.

Shcherbakov, V., Larsson, E.: Radial basis function partition of unity methods for pricing vanilla basket options. Tech. Rep. 2015–001, Department of Information Technology, Uppsala University (2015)

46.

Shepard, D.: A two-dimensional interpolation function for irregularly-spaced data. In: Proceedings of the 1968 23rd ACM national conference, ACM ’68, pp. 517–524. ACM, New York, NY, USA (1968). doi:10.1145/800186.810616

47.

Sonneveld, P., van Gijzen, M.B.: IDR(s): a family of simple and fast algorithms for solving large nonsymmetric linear systems. SIAM J. Sci. Comput. 31, 1035–1062 (2008). doi:10.1137/070685804 MathSciNetCrossRefMATH

48.

von Sydow, L., Höök, L.J., Larsson, E., Lindström, E., Milovanović, S., Persson, J., Shcherbakov, V., Shpolyanskiy, Y., Sirén, S., Toivanen, J., Waldén, J., Wiktorsson, M., Giles, M.B., Levesley, J., Li, J., Oosterlee, C.W., Ruijter, M.J., Toropov, A., Zhao, Y.: BENCHOP–The BENCHmarking project in option pricing. Int. J. Comput. Math. (2015). doi:10.1080/00207160.2015.1072172

49.

van der Vorst, H.A.: Bi-CGSTAB: a fast and smoothly converging variant of Bi-CG for the solution of nonsymmetric linear systems. SIAM J. Sci. Stat. Comput. 13, 631–644 (1992). doi:10.1137/0913035 MathSciNetCrossRefMATH

50.

Wendland, H.: Piecewise polynomial, positive definite and compactly supported radial functions of minimal degree. Adv. Comput. Math. 4(4), 389–396 (1995). doi:10.1007/BF02123482 MathSciNetCrossRefMATH

51.

Wendland, H.: Fast evaluation of radial basis functions: methods based on partition of unity. In: Approximation theory, X (St. Louis, MO, 2001), Innov. Appl. Math., pp. 473–483. Vanderbilt Univ. Press, Nashville, TN (2002)

Titel: Preconditioning for Radial Basis Function Partition of Unity Methods
verfasst von: Alfa Heryudono
Elisabeth Larsson
Alison Ramage
Lina von Sydow
Publikationsdatum: 19.10.2015
Verlag: Springer US
Erschienen in: Journal of Scientific Computing / Ausgabe 3/2016
Print ISSN: 0885-7474
Elektronische ISSN: 1573-7691
DOI: https://doi.org/10.1007/s10915-015-0120-6

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