N-ary group

The Susskind-Glogower operator, first proposed by Leonard Susskind and J. Glogower,^[1] refers to the operator where the phase is introduced as an approximate polar decomposition of the creation and annihilation operators.

It is defined as

${\displaystyle V={\frac {1}{\sqrt {aa^{\dagger }}}}a}$,

and its adjoint

${\displaystyle V^{\dagger }=a^{\dagger }{\frac {1}{\sqrt {aa^{\dagger }}}}}$.

Their commutation relation is

${\displaystyle [V,V^{\dagger }]=|0\rangle \langle 0|}$,

where ${\displaystyle |0\rangle }$ is the vacuum state of the harmonic oscillator.

They may be regarded as a (exponential of) phase operator because

${\displaystyle Va^{\dagger }aV^{\dagger }=a^{\dagger }a+1}$,

where ${\displaystyle a^{\dagger }a}$ is the number operator. So the exponential of the phase operator displaces the number operator in the same fashion as ${\displaystyle \exp \left(i{\frac {px_{o}}{\hbar }}\right)x\exp \left(-i{\frac {px_{o}}{\hbar }}\right)=x+x_{0}}$.

They may be used to solve problems such as atom-field interactions,^[2] level-crossings ^[3] or to define some class of non-linear coherent states,^[4] among others.

References

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