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Spherical Bessel functions jn and yn of integer order and real argument

โœ Scribed by R.W.B. Ardill; K.J.M. Moriarty

Publisher
Elsevier Science
Year
1978
Tongue
English
Weight
407 KB
Volume
14
Category
Article
ISSN
0010-4655

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๐Ÿ“œ SIMILAR VOLUMES

Bessel functions Jn(z) and Yn(z) of inte
Bessel functions Jn(z) and Yn(z) of integer order and complex argument
โœ C.F. du Toit ๐Ÿ“‚ Article ๐Ÿ“… 1993 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 574 KB

This paper describes computer subroutines which were developed to compute Bessel functions of the first and second kind (J,,(z) and 1,(z), respectively) for a complex argument z and a range of integer orders. A novel way of determining the starting point of backward recurrence is used, and the algor

Bessel functions Jv(x) and Yv(x) of real
Bessel functions Jv(x) and Yv(x) of real order and real argument
โœ J.B. Campbell ๐Ÿ“‚ Article ๐Ÿ“… 1979 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 787 KB

Title of program: BESSJY ## Method of solution For extremely smail argument, J~(x) and Y~(x)are deter-Catalogue number: ACZP

Bessel functions Iv(z) and Kv(z) of real
Bessel functions Iv(z) and Kv(z) of real order and complex argument
โœ J.B. Campbell ๐Ÿ“‚ Article ๐Ÿ“… 1981 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 713 KB

BESSIK cribed by Gautschi [1]. For arguments of large modulus, I~(z)is determined from its asymptotic expansion for large Catalogue number: AAQZ argument and backward recurrence. K~(z)and K~. 1(z)for vt ~1/2 are determined from Program obtaintable from: CPC Program Library, Queen's Neumann series wh