nLab Clebsch-Gordan coefficient

Redirected from "Wigner 3j symbol".

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Idea

Given a tensor product $\rho_{j_1} \otimes \rho_{j_2}$ of two representations of some Lie group $G$ (by default often the special orthogonal group $SO(3)$ ) and given its decomposition into a direct sum of irreducible representations $\{\rho_{t_{tot}}\}$ by an isomorphism

\rho_{j_1} \otimes \rho_{j_2} \stackrel{\simeq}{\longrightarrow} \underset{j_{tot}}{\oplus} C_{j_1 j_2}{}^{j_{tot}} \rho_{j_{tot}}

then the matrix elements of this linear map in some standard basis are called – in the physics literature – the Clebsch-Gordan coefficients or equivalently (up to a constant) the Wigner 3j symbols .

Specifically for $G = SO(3)$ the rotation group in 3-dimensional Cartesian space, then the standard basis elements of the representation $\rho_{j}$ of total angular momentum $j \in \mathbb{N}$ are traditionally denoted

|j,m\rangle \in \rho_{j} \;\;\,,\;\; -j \leq m \leq j

and their inner product is traditionally denoted by

\langle j_1, m_1 | j_2, m_2\rangle \in \mathbb{C} \,.

In these basis elements that above matrix then has components given by

\langle (j_1, m_1)\otimes(j_2,m_2) | j_{tot}, m_{tot}\rangle \in \mathbb{C} \,.

These expressions are specifically the Clebsch-Gordan coefficients as they appear in the physics literature.

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Lecture notes include for instance

M. Tuckerman, Quantum mechanics and dynamics – Addition of angular momenta – The general problem)

Last revised on January 6, 2017 at 11:24:05. See the history of this page for a list of all contributions to it.

nLab Clebsch-Gordan coefficient

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