Title :
High-Order Polynomial Interpolation Based on the Interpolation Center´s Neighborhood The Amendment to the Runge Phenomenon
Author_Institution :
Coll. of Comput. Sci., China West Normal Univ., Nanchong, China
Abstract :
High-order interpolation polynomial has better approximation to its original function near the interpolation center than low-order polynomial but will arise Runge phenomenon near the border of the interpolation area; while low-order interpolation polynomial has large error in the whole interpolation area. This article used high-order polynomial interpolation based on the interpolation center´s neighborhood to do high-order polynomial interpolation in the whole interpolation area, got the better approximation to the original function, and amended the Runge phenomenon effectively.
Keywords :
interpolation; polynomial approximation; Runge phenomenon; approximation theory; polynomial interpolation center neighborhood; Computer errors; Computer science; Convergence of numerical methods; Educational institutions; Interpolation; Lagrangian functions; Polynomials; Software engineering; Spline; Stability; Amendment; High-order polynomial; Interpolation center´s neighborhood; Runge phenomenon;
Conference_Titel :
Software Engineering, 2009. WCSE '09. WRI World Congress on
Conference_Location :
Xiamen
Print_ISBN :
978-0-7695-3570-8
DOI :
10.1109/WCSE.2009.295
