References
- Adams , R. A. and Fournier , J. J.F. 2003 . “ Sobolev Spaces ” . In Pure and Applied Mathematics (Amsterdam) , Vol. 140 , Amsterdam : Elsevier/Academic Press .
- Babuška , I. , Nobile , F. and Tempone , R. 2010 . A stochastic collocation method for elliptic partial differential equations with random input data . SIAM Rev. , 52 : 317 – 355 . (doi:10.1137/100786356)
- Berlinet , A. and Thomas-Agnan , C. 2004 . Reproducing Kernel Hilbert Spaces in Probability and Statistics , Boston , MA : Kluwer Academic Publishers .
- Buhmann , M. D. 2003 . “ Radial Basis Functions: Theory and Implementations ” . In Cambridge Monographs on Applied and Computational Mathematics , Vol. 12 , Cambridge : Cambridge University Press .
- Chow , P. L. 2007 . “ Stochastic Partial Differential Equations ” . In Chapman & Hall/CRC Applied Mathematics and Nonlinear Science Series , Boca Raton , FL : Chapman & Hall/CRC .
- Da Prato , G. and Zabczyk , J. 1992 . “ Stochastic Equations in Infinite Dimensions ” . In Encyclopedia of Mathematics and its Applications , Vol. 44 , Cambridge : Cambridge University Press .
- Deb , M. K. , Babuška , I. M. and Oden , J. T. 2001 . Solution of stochastic partial differential equations using Galerkin finite element techniques . Comput. Methods Appl. Mech. Eng. , 190 : 6359 – 6372 . (doi:10.1016/S0045-7825(01)00237-7)
- Fasshauer , G. E. 2007 . “ Meshfree Approximation Methods with Matlab ” . In Interdisciplinary Mathematical Sciences , Vol. 6 , Hackensack , NJ : World Scientific Publishing Co. Pte. Ltd .
- Fasshauer , G. E. 2011 . Positive definite kernels: Past, present and future . Dolomite Res. Notes Approx. , 4 : 21 – 63 .
- Fasshauer , G. E. and Ye , Q. 2011 . Reproducing kernels of generalized Sobolev spaces via a Green function approach with distributional operators . Numer. Math. , 119 : 585 – 611 . (doi:10.1007/s00211-011-0391-2)
- Fasshauer , G. E. and Ye , Q. 2011 . “ Reproducing kernels of Sobolev spaces via a Green kernel approach with differential operators and boundary operators ” . In Adv. Comput. Math DOI: 10.1007/s10444-011-9264-6.
- Hon , Y. C. and Schaback , R. The kernel-based method of lines for the heat equation preprint (2010). Available at http://num.math.uni-goettingen.de/schaback/research/papers/MKTftHE.pdf.
- Janson , S. 1997 . “ Gaussian Hilbert Spaces ” . In Cambridge Tracts in Mathematics , Vol. 129 , Cambridge : Cambridge University Press .
- Jentzen , A. and Kloeden , P. 2010 . Taylor expansions of solutions of stochastic partial differential equations with additive noise . Ann. Probab. , 38 : 532 – 569 . (doi:10.1214/09-AOP500)
- Karatzas , I. and Shreve , S. E. 1991 . “ Brownian Motion and Stochastic Calculus ” . In Graduate Texts in Mathematics , Vol. 113 , New York : Springer-Verlag .
- Lukić , M. N. and Beder , J. H. 2001 . Stochastic processes with sample paths in reproducing kernel Hilbert spaces . Trans. Amer. Math. Soc. , 353 : 3945 – 3969 . (doi:10.1090/S0002-9947-01-02852-5)
- Müller-Gronbach , T. , Ritter , K. and Wagner , T. 2008 . “ Optimal Pointwise Approximation of a Linear Stochastic Heat Equation with Additive Space–Time White Noise ” . In Monte Carlo and Quasi-Monte Carlo Methods 2006 , 577 – 589 . Berlin : Springer .
- Nobile , F. , Tempone , R. and Webster , C. G. 2008 . A sparse grid stochastic collocation method for partial differential equations with random input data . SIAM J. Numer. Anal. , 46 : 2309 – 2345 . (doi:10.1137/060663660)
- Rozovskii , B. L. 1990 . Stochastic Evolution Systems: Linear Theory and Applications to Nonlinear Filtering, Mathematics and its Applications (Soviet Series) , Vol. 35 , Dordrecht : Kluwer Academic Publishers Group .
- Scheuerer , M. , Schaback , R. and Schlather , M. “ Interpolation of spatial data – a stochastic or a deterministic problem? ” . preprint (2010). Available at http://num.math.uni-goettingen.de/schaback/research/papers/IoSD.pdf.
- Wendland , H. 2005 . “ Scattered Data Approximation ” . In Cambridge Monographs on Applied and Computational Mathematics , Vol. 17 , Cambridge : Cambridge University Press .
- Ye , Q. 2010 . “ Reproducing kernels of generalized Sobolev spaces via a Green function approach with differential operators ” . In Tech. Rep., Illinois Institute of Technology arXiv:1109.0109v1.
- Ye , Q. 2012 . “ Analyzing reproducing kernel approximation methods via a Green function approach ” . Illinois Institute of Technology . Ph.D. thesis