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Convergence and Gibbs' phenomenon in cubic spline interpolation of discontinuous functions

โœ Scribed by Zhimin Zhang; Clyde F. Martin

Publisher
Elsevier Science
Year
1997
Tongue
English
Weight
516 KB
Volume
87
Category
Article
ISSN
0377-0427

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โœฆ Synopsis

Convergence of cubic spline interpolation for discontinuous functions are investigated. It is shown that the complete cubic spline interpolation of the Heaviside step function converges in the LP-norm at rate O(h l/p) for quasi-uniform meshes when 1-%< p < oo, and diverges in the Lยฐยฐ-norm when the uniform meshes are used. No matter how small the uniform mesh size is, the complete cubic spline interpolation always oscillates near the discontinuity. Although this oscillation decays exponentially away from the discontinuous point, the maximum overshoot is not decreasing. Especially, we obtain the asymptotic maximum overshoot when the uniform mesh size goes to zero. The knowledge on the Heaviside function is utilized to discuss convergence properties of cubic spline interpolation for functions with isolated discontinuous points.

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