The Wigner D-matrix is a matrix in an irreducible representation of the groups SU(2) and SO(3). The complex conjugate of the D-matrix with integral indices is an eigenfunction of the Hamiltonian of spherical and symmetric rigid rotors.
Definition Wigner D-matrix
Let , , be generators of the Lie algebra of SU(2) and SO(3). In quantum mechanics these
three operators are the components of a vector operator known as angular momentum. Examples
are the angular momentum of an electron
in an atom, electronic spin,and the angular momentum
of a rigid rotor. In all cases the three operators satisfy the following commutation relations,
where i is the purely imaginary number and Planck's constant has been put equal to one. The operator
is a Casimir operator of SU(2) (or SO(3) as the case may be).
It may be diagonalized together with (the choice of this operator
is a convention), which commutes with . That is, it can be shown that there is a complete set of kets with
where and . (For SO(3) the quantum number is integer.)
A rotation operator can be written as
where and are Euler angles
(characterized by the keywords: z-y-z convention, right-handed frame, right-hand screw rule, active interpretation).
The Wigner D-matrix is a square matrix of dimension with
general element
The matrix with general element
is known as Wigner's (small) d-matrix.
Wigner (small) d-matrix
Wigner[1]
gave the following expression
The sum over s is over such values that the factorials are nonnegative.
Note: The d-matrix elements defined here are real. In the often-used z-x-z convention of Euler angles, the factor in this formula is replaced by , causing half of the functions to be purely imaginary. The realness of the d-matrix elements is one of the reasons that the z-y-z convention, used in this article, is usually preferred in quantum mechanical applications.
The d-matrix elements are related to Jacobi polynomials with nonnegative and . [2] Let
Then, with , the relation is
where
Properties of Wigner D-matrix
The complex conjugate of the D-matrix satisfies a number of differential properties
that can be formulated concisely by introducing the following operators with ,
which have quantum mechanical meaning: they are space-fixed rigid rotor angular momentum operators.
Further,
which have quantum mechanical meaning: they are body-fixed rigid rotor angular momentum operators.
The operators satisfy the commutation relations
and the corresponding relations with the indices permuted cyclically.
The satisfy anomalous commutation relations
(have a minus sign on the right hand side).
The two sets mutually commute,
and the total operators squared are equal,
Their explicit form is,
The operators act on the first (row) index of the D-matrix,
and
The operators act on the second (column) index of the D-matrix
and because of the anomalous commutation relation the raising/lowering operators
are defined with reversed signs,
Finally,
In other words, the rows and columns of the (complex conjugate) Wigner D-matrix span
irreducible representations of the isomorphic Lie algebra's generated by and .
An important property of the Wigner D-matrix follows from the commutation of
with the time reversal operator
,
or
Here we used that is anti-unitary (hence the complex conjugation after moving
from ket to bra), and .
Relation with spherical harmonic functions
The D-matrix elements with second index equal to zero, are proportional
to spherical harmonics, normalized to unity and with Condon and Shortley phase convention,
In the present convention of Euler angles, is
a longitudinal angle and is a colatitudinal angle (spherical polar angles
in the physical definition of such angles). This is one of the reasons that the z-y-z
convention is used frequently in molecular physics.
From the time-reversal property of the Wigner D-matrix follows immediately
References
Cited references
- ↑ E. P. Wigner, Gruppentheorie und ihre Anwendungen auf die Quantenmechanik der Atomspektren, Vieweg Verlag, Braunschweig (1931). Translated into English: J. J. Griffin, Group Theory and its Application to the Quantum Mechanics of Atomic Spectra, Academic Press, New York (1959).
- ↑ L. C. Biedenharn and J. D. Louck,
Angular Momentum in Quantum Physics, Addison-Wesley, Reading, (1981).