DocumentCode
610868
Title
Multiple-Precision Evaluation of the Airy Ai Function with Reduced Cancellation
Author
Chevillard, S. ; Mezzarobba, M.
Author_Institution
Apics Project-Team, Inria, Sophia Antipolis, France
fYear
2013
fDate
7-10 April 2013
Firstpage
175
Lastpage
182
Abstract
The series expansion at the origin of the Airy function Ai(x) is alternating and hence problematic to evaluate for x > 0 due to cancellation. Based on a method recently proposed by Gawronski, Müller, and Rein hard, we exhibit two functions F and G, both with nonnegative Taylor expansions at the origin, such that Ai(x) = G(x)/F(x). The sums are now well-conditioned, but the Taylor coefficients of G turn out to obey an ill-conditioned three-term recurrence. We use the classical Miller algorithm to overcome this issue. We bound all errors and our implementation allows an arbitrary and certified accuracy, that can be used, e.g., for providing correct rounding in arbitrary precision.
Keywords
differential equations; series (mathematics); Airy Ai function; Taylor coefficients; cancellation reduction; classical Miller algorithm; ill-conditioned three-term recurrence; linear ordinary differential equation; multiple-precision evaluation; nonnegative Taylor expansions; series expansion; Accuracy; Algorithm design and analysis; Approximation algorithms; Approximation methods; Equations; Shape; Taylor series; Miller method; Special functions; algorithm; arbitrary precision; asymptotics; correct rounding; error bounds; numerical evaluation;
fLanguage
English
Publisher
ieee
Conference_Titel
Computer Arithmetic (ARITH), 2013 21st IEEE Symposium on
Conference_Location
Austin, TX
ISSN
1063-6889
Print_ISBN
978-1-4673-5644-2
Type
conf
DOI
10.1109/ARITH.2013.33
Filename
6545905
Link To Document