Total angular momentum quantum number

In quantum mechanics, the total angular momentum quantum number parametrises the total angular momentum of a given particle, by combining its orbital angular momentum and its intrinsic angular momentum (i.e., its spin).

If s is the particle's spin angular momentum and ℓ its orbital angular momentum vector, the total angular momentum j is $\mathbf {j} =\mathbf {s} {\boldsymbol {\ell }}~.$

The associated quantum number is the main total angular momentum quantum number j. It can take the following range of values, jumping only in integer steps: $\vert \ell -s\vert \leq j\leq \ell s$ where ℓ is the azimuthal quantum number (parameterizing the orbital angular momentum) and s is the spin quantum number (parameterizing the spin).

The relation between the total angular momentum vector j and the total angular momentum quantum number j is given by the usual relation (see angular momentum quantum number) $\Vert \mathbf {j} \Vert ={\sqrt {j\,(j 1)}}\,\hbar$

The vector's z-projection is given by $j_{z}=m_{j}\,\hbar$ where m_j is the secondary total angular momentum quantum number, and the $\hbar$ is the reduced Planck constant. It ranges from −j to j in steps of one. This generates 2j 1 different values of m_j.

The total angular momentum corresponds to the Casimir invariant of the Lie algebra so(3) of the three-dimensional rotation group.

References

Griffiths, David J. (2004). Introduction to Quantum Mechanics (2nd ed.). Prentice Hall. ISBN 0-13-805326-X.
Albert Messiah, (1966). Quantum Mechanics (Vols. I & II), English translation from French by G. M. Temmer. North Holland, John Wiley & Sons.

External links

Vector model of angular momentum
LS and jj coupling

Chapter 5 ManyElectron Atoms 51 Total Angular Momentum Spin

Quantum Angular Momentum

Solved Consider a system with total angular momentum quantum

PPT Vector coupling of angular momentum PowerPoint Presentation, free

See also

References

External links