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Result 1 to 20 of 21 total

Construction of generators of quasi-interpolation operators of high approximation orders in spaces of polyharmonic splines. (English)
J. Comput. Appl. Math. 236, No. 4, 557-564 (2011).
1
Polyharmonic splines: an approximation method for noisy scattered data of extra-large size. (English)
Appl. Math. Comput. 216, No. 1, 317-331 (2010).
2
Kernel B-splines on general lattices. (English)
J. Comput. Appl. Math. 233, No. 7, 1620-1630 (2010).
3
Polyharmonic multiresolution analysis: An overview and some new results. (English)
Numer. Algorithms 48, No. 1-3, 135-160 (2008).
4
A multiresolution analysis with a new family of polyharmonic B-splines. (English)
Cohen, Albert (ed.) et al., Curve and surface fitting. Avignon 2006. Proceedings 6th international conference on curves and surfaces, Avignon, France, June 29 ‒ July 5, 2006. Brentwood: Nashboro Press (ISBN 978-0-9728482-8-2/hbk). Modern Methods in Mathematics, 51-60 (2007).
5
Convergence of polyharmonic splines on semi-regular grids $\Bbb Z \times \Bbb Z^n$ for $a\rightarrow 0$. (English)
Numer. Algorithms 44, No. 3, 255-272 (2007).
6
On the errors of multidimensional MRA based on non-separable scaling functions. (English)
Int. J. Wavelets Multiresolut. Inf. Process. 4, No. 3, 475-488 (2006).
7
Detecting discontinuities in two-dimensional sampled signals by polyharmonic pre-wavelets. (English)
Simos, Theodore S. (ed.) et al., ICNAAM 2005. International conference on numerical analysis and applied mathematics 2005. Official conference of the European Society of Computational Methods in Sciences and Engineering (ESCMSE), Rhodes, Greek, September 16‒20, 2005. Weinheim: Wiley-VCH (ISBN 3-527-40652-2/hbk). 635-638 (2005).
8
Polyharmonic splines on grids $\Bbb{Z}\times a\Bbb{Z} ^{n}$ and their limits. (English)
Math. Comput. 74, No. 252, 1831-1841 (2005).
9
Decomposition and reconstruction of multidimensional signals using polyharmonic pre-wavelets. (English)
Appl. Comput. Harmon. Anal. 18, No. 3, 282-299 (2005).
10
Inversion of the spherical Radon transform by a Poisson type formula. (English)
Quinto, Eric Todd (ed.) et al., Radon transforms and tomography. 2000 AMS-IMS-SIAM joint summer research conference, South Hadley, MA, USA, June 18-22, 2000. Providence, RI: American Mathematical Society (AMS). Contemp. Math. 278, 137-146 (2001).
11
Fast evaluation of radial basis functions: Methods for four-dimensional polyharmonic splines. (English)
SIAM J. Math. Anal. 32, No.6, 1272-1310 (2001).
Reviewer: R.S.Dahiya (Ames)
12
Fast solution of the radial basis function interpolation equations: Domain decomposition methods. (English)
SIAM J. Sci. Comput. 22, No.5, 1717-1740 (2001).
13
Multidimensional interpolation and numerical integration by BEM. (English)
Brebbia, C. A. (ed.) et al., Boundary elements. XXI. Papers from the 21st international conference on the boundary element method, Oxford, Great Britain, August 1999. Southampton: WIT Press. Int. Ser. Adv. Bound. Elem. 6, 209-218 (1999).
14
Spline type summability for multivariate sampling. (English)
Bray, William O. (ed.) et al., Analysis of divergence. Control and management of divergent processes. Proceedings of the 7th international workshop in analysis and its applications, IWAA, Orono, ME, USA June 1-6, 1997. Boston, MA: Birkhäuser. Applied and Numerical Harmonic Analysis. 475-512 (1999).
15
Minimizing the Laplacian of a function squared with prescribed values on interior boundaries ‒ Theory of polysplines. (English)
Trans. Am. Math. Soc. 350, No.5, 2105-2128 (1998).
16
Fast evaluation of radial basis functions: Methods for two-dimensional polyharmonic splines. (English)
IMA J. Numer. Anal. 17, No.3, 343-372 (1997).
17
Splines constructed by pieces of polyharmonic functions. (English)
Laurent, Pierre-Jean (ed.) et al., Wavelets, images, and surface fitting. Papers from the 2nd international conference on curves and surfaces, held in Chamonix-Mont-Blanc, France, June 10-16, 1993. Wellesley, MA: A K Peters. 319-326 (1994).
18
Using the refinement equation for the construction of pre-wavelets. IV: Cube splines and elliptic splines united. (English)
Gonchar, A. A. (ed.) et al., Methods of approximation theory in complex analysis and mathematical physics. Selected papers of international seminars on “Methods of approximation theory in complex analysis and mathematical physics" held in Leningrad, Russia, May 13-26, 1991. Berlin: Springer-Verlag. Lect. Notes Math. 1550, 62-70 (1993).
19
Using the refinement equation for the construction of pre-wavelets. III: Elliptic splines. (English)
Numer. Algorithms 1, No.4, 331-351 (1991).
20
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Result 1 to 20 of 21 total