Tag Archives: CONDON


Condon and Shortley has become the standard comprehensive work on the theory of atomic spectra. The first two chapters contain a brief historical introduction. The $(-1)^m$ phase factor in some definitions of the Spherical Harmonics and associated Legendre Polynomials. Using the Condon-Shortley convention gives. An algorithm is presented for the generation and storage of all unique, non-zero Condon-Shortley coefficients. The formulas for retrieving these coefficients in a.

Author: Tygozahn Mole
Country: Maldives
Language: English (Spanish)
Genre: Relationship
Published (Last): 19 October 2017
Pages: 426
PDF File Size: 15.32 Mb
ePub File Size: 3.15 Mb
ISBN: 495-6-37695-247-3
Downloads: 96906
Price: Free* [*Free Regsitration Required]
Uploader: Maktilar

By clicking “Post Your Answer”, you acknowledge that you have read our updated terms of serviceprivacy shortleu and cookie policyand that your continued use of the website is subject to these policies. Explore the Home Gift Guide.

Condon-Shortley Phase

This page was last edited on 23 Octoberat AmazonGlobal Ship Orders Internationally. There’s a problem loading this menu right now.

I, the copyright holder of this work, hereby publish it under the following licenses: It may be verified that this agrees with the function listed here and here. Mathematical Methods for Physicists, 3rd ed. Alexa Actionable Analytics for the Web. The following pages on the English Wikipedia link to this file pages on other projects are not listed:. From this perspective, one has the following generalization to higher dimensions. Hints help you try the next zhortley on your own.

This does not affect the angular portion of the spherical harmonics. This polynomial is easily seen to be harmonic. Read more Read less. This comes from Aarfken, 6th edEq. This expansion holds in the sense of mean-square convergence — convergence in L 2 of the sphere — which is to say that. If this file has problems with attributioncopyrightor is otherwise ineligible for Commons, then remove this tag and DO NOT transfer it; repeat violators may be blocked from editing. The magnetics [11] community, in contrast, uses Schmidt semi-normalized harmonics.

More generally, the analogous statements hold in higher dimensions: Retrieved from ” https: In cndon mechanics, Laplace’s spherical shortleu are understood in terms of the orbital angular momentum [4].

The Clebsch—Gordan coefficients are the coefficients appearing in the expansion of the product of two spherical harmonics in terms of spherical harmonics themselves. Condin files to Commons for details.

File:No Condon-Shortley – Wikipedia

A real basis of spherical harmonics can be defined in terms of their complex analogues by setting. By conddon this site, you agree to the Terms of Use and Privacy Policy. Contact the MathWorld Team. Science in commented that it ‘has served half a generation and as a guide in further detailed research’, and Reviews of Modern Physics in that this ‘monumental book More generally, hypergeometric series can be generalized to describe the symmetries of any symmetric space ; in particular, hypergeometric series can be developed for any Lie group.

The Theory of Atomic Spectra: E. U. Condon, G. H. Shortley: : Books

Please try again later. I ordered this text specifically for the genearlized form of the angular momentum coupling constants near the end of Chapter 3 and have not had a chance to read the entire text. Journal of Mathematical Physics.

The first two chapters contain a brief historical introduction and an exposition of quantum mechanics along the lines formulated by Dirac.

In the standard way one writes. InWilliam Thomson Lord Kelvin and Peter Guthrie Tait introduced the solid spherical harmonics in their Treatise on Natural Philosophyand also first introduced the name of “spherical harmonics” for these functions. Sign up using Facebook. Set up a giveaway.

This file is a candidate to be copied to Wikimedia Commons. You may select the license of your choice. The functions codon the product are defined in terms of the Legendre function. The convergence of the series holds again in the same sense, but the benefit of the real expansion is that for real functions f the expansion coefficients become real. However, this text is one of my Ph. Relevant discussion may be found on Talk: