The Holstein-Primakoff transformation in quantum mechanics is a mapping to the spin operators from boson creation and annihilation operators, effectively truncating their infinite-dimensional Fock space to finite-dimensional subspaces.
One important aspect of quantum mechanics is the occurrence of—in general—non-commuting operators which represent observables, quantities that can be measured. A standard example of a set of such operators are the three components of the angular momentum operators, which are crucial in many quantum systems. These operators are complicated, and one would like to find a simpler representation, which can be used to generate approximate calculational schemes.
The transformation was developed in 1940 by Theodore Holstein, a graduate student at the time, and Henry Primakoff. This method has found widespread applicability and has been extended in many different directions.
There is a close link to other methods of boson mapping of operator algebras: in particular, the (non-hermitian) Dyson-Maleev technique, and to a lesser extent the Jordan–Schwinger map. There is, furthermore, a close link to the theory of (generalized) coherent states in Lie algebras.
The basic technique
The basic idea can be illustrated for the basic example of spin operators of quantum mechanics.
For any set of right-handed orthogonal axes, define the components of this vector operator as
In order to uniquely specify the states of a spin, one may diagonalise any set of commuting operators. Normally one uses the SU(2) Casimir operators
The projection quantum number
Consider a single particle of spin s (i.e., look at a single irreducible representation of SU(2)). Now take the state with maximal projection
Each additional boson then corresponds to a decrease of ħ in the spin projection. Thus, the spin raising and lowering operators
The resulting Holstein–Primakoff transformation can be written as
The transformation is particularly useful in the case where s is large, when the square roots can be expanded as Taylor series, to give an expansion in decreasing powers of s.
The nonhermitean Dyson-Maleev variant realization J is related to the above,
satisfying the same commutation relations and characterized by the same Casimir invariant.
The technique can be further extended to the Witt algebra, which is the centerless Virasoro algebra.