论文信息 - Computing quasi-interpolants from the B-form of B-splines

Computing quasi-interpolants from the B-form of B-splines

Abstract: In general, for a sufficiently regular function, an expression for the quasi-interpolation error associated with discrete, differential and integral quasi-interpolants can be derived involving a term measuring how well the non-reproduced monomials are approximated. That term depends on some expressions of the coefficients defining the quasi-interpolant, and its minimization has been proposed. However, the resulting problem is rather complex and often requires some computational effort. Thus, for quasi-interpolants defined from a piecewise polynomial function, @f, we propose a simpler minimization problem, based on the Bernstein-Bezier representation of some related piecewise polynomial functions, leading to a new class of quasi-interpolants.

[1] María José Ibáñez-Pérez,et al. On Chebyshev-type discrete quasi-interpolants , 2008, Math. Comput. Simul..

[2] María José,et al. Quasi-interpolantes spline discretos con norma casi mínima. Teoría y aplicaciones , 2013 .

[3] Larry L. Schumaker,et al. Spline functions on triangulations , 2007, Encyclopedia of mathematics and its applications.

[4] R. Franke. Scattered data interpolation: tests of some methods , 1982 .

[5] Shai Dekel,et al. On Measuring the Efficiency of Kernel Operators in Lp(Rd) , 2004, Adv. Comput. Math..

[6] Steven A. Orszag,et al. CBMS-NSF REGIONAL CONFERENCE SERIES IN APPLIED MATHEMATICS , 1978 .

[7] C. D. Boor,et al. Box splines , 1993 .

[8] Miguel A. Fortes,et al. On Chebyshev-type integral quasi-interpolation operators , 2009, Math. Comput. Simul..

[9] M. J. Ibáñez-Pérez,et al. Minimizing the quasi-interpolation error for bivariate discrete quasi-interpolants , 2009 .

[10] Wolfgang Dahmen,et al. Translates of multivarlate splines , 1983 .

[11] G. Watson. Approximation theory and numerical methods , 1980 .