Raising and Lowering Operators

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## Terminology

## General formulation

## Angular momentum

### Applications in atomic and molecular physics

## Harmonic oscillator

## History

## See also

## References

This article uses material from the Wikipedia page available here. It is released under the Creative Commons Attribution-Share-Alike License 3.0.

Raising and Lowering Operators

In linear algebra (and its application to quantum mechanics), a **raising** or **lowering operator** (collectively known as **ladder operators**) is an operator that increases or decreases the eigenvalue of another operator. In quantum mechanics, the raising operator is sometimes called the creation operator, and the lowering operator the annihilation operator. Well-known applications of ladder operators in quantum mechanics are in the formalisms of the quantum harmonic oscillator and angular momentum.

There is some confusion regarding the relationship between the raising and lowering ladder operators and the creation and annihilation operators commonly used in quantum field theory. The creation operator *a _{i}*

Confusion arises because the term *ladder operator* is typically used to describe an operator that acts to increment or decrement a quantum number describing the state of a system. To change the state of a particle with the creation/annihilation operators of QFT requires the use of *both* an annihilation operator to remove a particle from the initial state *and* a creation operator to add a particle to the final state.

The term "ladder operator" is also sometimes used in mathematics, in the context of the theory of Lie algebras and in particular the affine Lie algebras, to describe the su(2) subalgebras, from which the root system and the highest weight modules can be constructed by means of the ladder operators.^{[1]} In particular, the highest weight is annihilated by the raising operators; the rest of the positive root space is obtained by repeatedly applying the lowering operators (one set of ladder operators per subalgebra).

Suppose that two operators *X* and *N* have the commutation relation,

for some scalar *c*. If is an eigenstate of *N* with eigenvalue equation,

then the operator *X* acts on in such a way as to shift the eigenvalue by *c*:

In other words, if is an eigenstate of *N* with eigenvalue *n* then is an eigenstate of *N* with eigenvalue *n* + *c* or it is zero. The operator *X* is a *raising operator* for *N* if *c* is real and positive, and a *lowering operator* for *N* if *c* is real and negative.

If *N* is a Hermitian operator then *c* must be real and the Hermitian adjoint of *X* obeys the commutation relation:

In particular, if *X* is a lowering operator for *N* then *X*^{+} is a raising operator for *N* and vice versa.

A particular application of the ladder operator concept is found in the quantum mechanical treatment of angular momentum. For a general angular momentum vector, **J**, with components, *J _{x}*,

where *i* is the imaginary unit.

The commutation relation between the cartesian components of *any* angular momentum operator is given by

where *? _{ijk}* is the Levi-Civita symbol and each of

The properties of the ladder operators can be determined by observing how they modify the action of the *J _{z}* operator on a given state:

Compare this result with:

Thus we conclude that is some scalar multiplied by ,

This illustrates the defining feature of ladder operators in quantum mechanics: the incrementing (or decrementing) of a quantum number, thus mapping one quantum state onto another. This is the reason that they are often known as raising and lowering operators.

To obtain the values of *?* and *?* we first take the norm of each operator, recognizing that *J*_{+} and *J*_{-} are a Hermitian conjugate pair (),

- ,

- .

The product of the ladder operators can be expressed in terms of the commuting pair *J*^{2} and *J _{z}*,

Thus we can express the values of |*?*|^{2} and |*?*|^{2} in terms of the eigenvalues of *J*^{2} and *J _{z}*,

The phases of *?* and *?* are not physically significant, thus they can be chosen to be positive and real (Condon-Shortley phase convention). We then have:^{[3]}

Confirming that *m* is bounded by the value of *j* () we have:

The above demonstration is effectively the construction of the Clebsch-Gordan coefficients.

Many terms in the Hamiltonians of atomic or molecular systems involve the scalar product of angular momentum operators. An example is the magnetic dipole term in the hyperfine Hamiltonian,^{[4]}

where *I* is the nuclear spin.
Angular momentum algebra can often be simplified by recasting it in the spherical basis. Using the notation of spherical tensor operators, the "-1", "0" and "+1" components of **J**^{(1)} ? **J** are given by,^{[5]}

From these definitions it can be shown that the above scalar product can be expanded as

The significance of this expansion is that it clearly indicates which states are coupled by this term in the Hamiltonian, that is those with quantum numbers differing by *m _{i}* = ±1 and

Another application of the ladder operator concept is found in the quantum mechanical treatment of the harmonic oscillator. We can define the lowering and raising operators as

They provide a convenient means to extract energy eigenvalues without directly solving the system's differential equation.

Many sources credit Dirac with the invention of ladder operators.^{[6]} Dirac's use of the ladder operators shows that the total angular momentum quantum number needs to be a non-negative *half* integer multiple of ?.

**^**Fuchs, Jurgen (1992),*Affine Lie Algebras and Quantum Groups*, Cambridge University Press, ISBN 0-521-48412-X**^**de Lange, O. L.; R. E. Raab (1986). "Ladder operators for orbital angular momentum".*American Journal of Physics*.**54**(4): 372-375. Bibcode:1986AmJPh..54..372D. doi:10.1119/1.14625.**^**Sakurai, Jun J. (1994).*Modern Quantum Mechanics*. Delhi, India: Pearson Education, Inc. p. 192. ISBN 81-7808-006-0.**^**Woodgate, Gordon K. (1983-10-06).*Elementary Atomic Structure*. ISBN 978-0-19-851156-4. Retrieved .**^**"Angular Momentum Operators".*Graduate Quantum Mechanics Notes*. University of Virginia. Retrieved .**^**http://www.fisica.net/quantica/quantum_harmonic_oscillator_lecture.pdf

This article uses material from the Wikipedia page available here. It is released under the Creative Commons Attribution-Share-Alike License 3.0.

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