Optimal Sampling for Linear Function Approximation and High-Order Finite Difference Methods over Complex Regions

Optimal Sampling for Linear Function Approximation and High-Order Finite Difference Methods over Complex Regions

abstract: I focus on algorithms that generate good sampling points for function approximation. In 1D, it is well known that polynomial interpolation using equispaced points is unstable. On the other hand, using Chebyshev nodes provides both stable and highly accurate points for polynomial interpolat...

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Bibliographic Details
Other Authors:	Liu, Tony (Author)
Format:	Doctoral Thesis
Language:	English
Published:	2019
Subjects:	Applied mathematics Finite Difference Methods Function Approximation Lebesgue Constant Optimal Sampling
Online Access:	http://hdl.handle.net/2286/R.I.54897

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