The approximation power of moving least-squares
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[1] G. Backus,et al. Numerical Applications of a Formalism for Geophysical Inverse Problems , 1967 .
[2] D. Shepard. A two-dimensional interpolation function for irregularly-spaced data , 1968, ACM National Conference.
[3] D. H. McLain,et al. Two Dimensional Interpolation from Random Data , 1976, Comput. J..
[4] S. Rippa,et al. Data Dependent Triangulations for Piecewise Linear Interpolation , 1990 .
[5] Shoshonnah Vardi,et al. From Tel Aviv , 1951 .
[6] G. Backus,et al. The Resolving Power of Gross Earth Data , 1968 .
[7] D. Levin,et al. On quasi-interpolation by radial basis functions with scattered centres , 1995 .
[8] R. Farwig,et al. Multivariate interpolation of arbitrarily spaced data by moving least squares methods , 1986 .
[9] Richard Franke,et al. Smooth interpolation of large sets of scattered data , 1980 .
[10] R. Franke. Scattered data interpolation: tests of some methods , 1982 .
[11] G. Backus,et al. Uniqueness in the inversion of inaccurate gross Earth data , 1970, Philosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences.
[12] K. Salkauskas,et al. Moving least-squares are Backus-Gilbert optimal , 1989 .
[13] P. Lancaster,et al. Surfaces generated by moving least squares methods , 1981 .
[14] D. H. McLain,et al. Drawing Contours from Arbitrary Data Points , 1974, Comput. J..