Titlebook: Approximation Theory XVI; Nashville, TN, USA, Gregory E. Fasshauer,Marian Neamtu,Larry L. Schuma Conference proceedings 2021 Springer Natu

宿醉

lesion

Quasi-Interpolant Operators and the Solution of Fractional Differential Problems,oblem is approximated by a spline quasi-interpolant operator. This allows us to construct the numerical solution in an easy way. We show through some numerical tests that the proposed method is efficient and accurate.

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大酒杯

Verantwortung geben und nehmen,usual properties of optimal recovery. Application examples include generation of sparse kernel-based numerical differentiation formulas for the Laplacian on a grid and accurate approximation of a function on an ellipse.

輕快帶來(lái)危險(xiǎn)

https://doi.org/10.1007/978-3-663-08476-1rs. We derive an ESPRIT-like algorithm for the generalized recovery method and illustrate, how the method can be simplified if some frequency parameters are known beforehand. Furthermore, we present a modification of Prony’s method for sparse approximation with exponential sums which leads to a non-linear least-squares problem.

GLARE

-Quartic Butterfly-Spline Interpolation on Type-1 Triangulations, is obtained for enough regular functions as well as the optimal order of approximation. We construct such interpolating splines by combining a quasi-interpolating spline with one step of an interpolatory subdivision scheme. Numerical tests confirming the theoretical results are provided.

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