Clebsch-Gordan coefficients

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This article presupposes knowledge of the quantum theory of angular momentum and angular momentum coupling.


In quantum mechanics, the Clebsch-Gordan coefficients (CG coefficients) are sets of numbers that arise in angular momentum coupling.

In mathematics, the CG coefficients appear in group representation theory, particularly of compact Lie groups. They arise in the explicit direct sum decomposition of the outer product of two irreducible representations (irreps) of a group G. In general the outer product representation (rep)—which is carried by a tensor product space—is reducible under G. Decomposition of the outer product rep into irreps of G requires a basis transformation of the tensor product space. The CG coefficients are the elements of the matrix of this basis transformation. In physics it is common to consider only orthonormal bases of the vector spaces involved, and then CG coefficients constitute a unitary matrix.

The name derives from the German mathematicians Alfred Clebsch (1833-1872) and Paul Gordan (1837-1912), who encountered an equivalent problem in invariant theory.

The formulas below use Dirac's bra-ket notation, i.e., the quantity stands for a positive definite inner product between the elements ψ and φ of the same complex inner product space. We follow the physical convention , where is the complex conjugate of the complex number c.

Angular momentum CG coefficients

Although Clebsch-Gordan coefficients can be defined for arbitrary groups, we restrict our attention in this article to the groups associated with space and spin angular momentum, namely the groups SO(3) and SU(2). In that case CG coefficients can be defined as the expansion coefficients of total angular momentum eigenstates in an uncoupled tensor product basis. See the article angular momentum for the definition of angular momentum operators and their eigenstates. Since the definition of CG coefficients needs the definition of tensor products of angular momentum eigenstates, this will be given first.

From the formal definition recursion relations for the Clebsch-Gordan coefficients can be found. In order to settle the numerical values for the coefficients, a phase convention must be adopted. Below the Condon and Shortley phase convention is chosen.

Tensor product space

Let be the dimensional vector space spanned by the eigenstates of and

and the dimensional vector space spanned by the eigenstates of and

The tensor product of these spaces, , has a dimensional uncoupled basis

Angular momentum operators acting on can be defined by

and

Total angular momentum operators are defined by

The total angular momentum operators satisfy the commutation relations

showing that J is indeed an angular momentum operator. The quantity is the Levi-Civita symbol. Hence total angular momentum eigenstates exist

It can be derived—see, e.g., this article—that must satisfy the triangular condition

The total number of total angular momentum eigenstates is equal to the dimension of

The total angular momentum states form an orthonormal basis of

Formal definition of Clebsch-Gordan coefficients

The total angular momentum states can be expanded in the uncoupled basis

The expansion coefficients are called Clebsch-Gordan coefficients.

Applying the operator

to both sides of the defining equation shows that the Clebsch-Gordan coefficients can only be nonzero when

Recursion relations

Applying the total angular momentum raising and lowering operators, see e.g., this article,

to the left hand side of the defining equation gives

Applying the same operators to the right hand side gives

Combining these results gives recursion relations for the Clebsch-Gordan coefficients

Taking the upper sign with gives

In the Condon and Shortley phase convention the coefficient is taken real and positive. With the last equation all other Clebsch-Gordan coefficients can be found. The normalization is fixed by the requirement that the sum of the squares, which corresponds to the norm of the state must be one.

The lower sign in the recursion relation can be used to find all the Clebsch-Gordan coefficients with . Repeated use of that equation gives all coefficients.

This procedure to find the Clebsch-Gordan coefficients shows that they are all real (in the Condon and Shortley phase convention).

Explicit expression

The first derivation of an algebraic formula for CG coefficients was given by Wigner in his famous 1931 book. The following expression for the CG coefficients is due to Van der Waerden (1932) and is the most symmetric one of the various existing forms, see, e.g., Biedenharn and Louck (1981) for a derivation,

where

and the sum runs over all values of t which do not lead to negative factorials.

Orthogonality relations

These are most clearly written down by introducing the alternative notation

The first orthogonality relation is

and the second

Special cases

For the Clebsch-Gordan coefficients are given by

For and we have

Symmetry properties

Relation to 3-jm symbols

Clebsch-Gordan coefficients are related to 3-jm symbols which have more convenient symmetry relations.

See also

External links

References

  • Wigner, E. P. (1931). Gruppentheorie und ihre Anwendungen auf die Quantenmechanik der Atomspektren. Braunschweig: Vieweg Verlag.  Translated into English: J. J. Griffin, Group Theory and its Application to the Quantum Mechanics of Atomic Spectra, Academic Press, New York (1959).
  • Edmonds, A. R. (1957). Angular Momentum in Quantum Mechanics. Princeton, New Jersey: Princeton University Press. ISBN 0-691-07912-9. 
  • Condon, Edward U.; Shortley, G. H. (1970). “Chapter 3”, The Theory of Atomic Spectra. Cambridge: Cambridge University Press. ISBN 0-521-09209-4. 
  • Messiah, Albert (1981). Quantum Mechanics (Volume II), 12th edition. New York: North Holland Publishing. ISBN 0-7204-0045-7. 
  • Brink, D. M.; Satchler, G. R. (1993). “Chapter 2”, Angular Momentum, 3rd edition. Oxford: Clarendon Press. ISBN 0-19-851759-9. 
  • Zare, Richard N. (1988). “Chapter 2”, Angular Momentum. New York: John Wiley & Sons. ISBN 0-471-85892-7. 
  • Biedenharn, L. C.; Louck, J. D. (1981). Angular Momentum in Quantum Physics. Reading, Massachusetts: Addison-Wesley. ISBN 0201135078.