Jump to content

Heine's identity

From Wikipedia, the free encyclopedia

This is the current revision of this page, as edited by Hellacioussatyr (talk | contribs) at 00:09, 7 February 2022. The present address (URL) is a permanent link to this version.

(diff) ← Previous revision | Latest revision (diff) | Newer revision → (diff)

In mathematical analysis, Heine's identity, named after Heinrich Eduard Heine[1] is a Fourier expansion of a reciprocal square root which Heine presented as where[2] is a Legendre function of the second kind, which has degree, m − 12, a half-integer, and argument, z, real and greater than one. This expression can be generalized[3] for arbitrary half-integer powers as follows where is the Gamma function.

References

[edit]
  1. ^ Heine, Heinrich Eduard (1881). Handbuch der Kugelfunctionen, Theorie und Andwendungen. Wuerzburg: Physica-Verlag. (See page 286)
  2. ^ Cohl, Howard S.; J.E. Tohline; A.R.P. Rau; H.M. Srivastava (2000). "Developments in determining the gravitational potential using toroidal functions". Astronomische Nachrichten. 321 (5/6): 363–372. Bibcode:2000AN....321..363C. doi:10.1002/1521-3994(200012)321:5/6<363::AID-ASNA363>3.0.CO;2-X. ISSN 0004-6337.
  3. ^ Cohl, H. S. (2003). "Portent of Heine's Reciprocal Square Root Identity". 3D Stellar Evolution, ASP Conference Proceedings, held 22-26 July 2002 at University of California Davis, Livermore, California, USA. Edited by Sylvain Turcotte, Stefan C. Keller and Robert M. Cavallo. Vol. 293. ISBN 1-58381-140-0.