Quantum rotor model

The quantum rotor model is a mathematical model for a quantum system. It can be visualized as an array of rotating electrons which behave as rigid rotors that interact through short-range dipole-dipole magnetic forces originating from their magnetic dipole moments (neglecting Coulomb forces). The model differs from similar spin-models such as the Ising model and the Heisenberg model in that it includes a term analogous to kinetic energy.

Although elementary quantum rotors do not exist in nature, the model can describe effective degrees of freedom for a system of sufficiently small number of closely coupled electrons in low-energy states.^[1]

Suppose the n-dimensional position (orientation) vector of the model at a given site ${\displaystyle i}$ is ${\displaystyle \mathbf {n} }$. Then, we can define rotor momentum ${\displaystyle \mathbf {p} }$ by the commutation relation of components ${\displaystyle \alpha ,\beta }$

${\displaystyle [n_{\alpha },p_{\beta }]=i\delta _{\alpha \beta }}$

However, it is found convenient^[1] to use rotor angular momentum operators ${\displaystyle \mathbf {L} }$ defined (in 3 dimensions) by components ${\displaystyle L_{\alpha }=\varepsilon _{\alpha \beta \gamma }n_{\beta }p_{\gamma }}$

Then, the magnetic interactions between the quantum rotors, and thus their energy states, can be described by the following Hamiltonian:

${\displaystyle H_{R}={\frac {J{\bar {g}}}{2}}\sum _{i}\mathbf {L} _{i}^{2}-J\sum _{\langle ij\rangle }\mathbf {n} _{i}\cdot \mathbf {n} _{j}}$

where ${\displaystyle J,{\bar {g}}}$ are constants.. The interaction sum is taken over nearest neighbors, as indicated by the angle brackets. For very small and very large ${\displaystyle {\bar {g}}}$, the Hamiltonian predicts two distinct configurations (ground states), namely "magnetically" ordered rotors and disordered or "paramagnetic" rotors, respectively.^[1]

The interactions between the quantum rotors can be described by another (equivalent) Hamiltonian, which treats the rotors not as magnetic moments but as local electric currents.^[2]

Properties

One of the important features of the rotor model is the continuous O(N) symmetry, and hence the corresponding continuous symmetry breaking in the magnetically ordered state. In a system with two layers of Heisenberg spins ${\displaystyle \mathbf {S} _{1i}}$ and ${\displaystyle \mathbf {S} _{2i}}$, the rotor model approximates the low-energy states of a Heisenberg antiferromagnet, with the Hamiltonian

${\displaystyle H_{d}=K\sum _{i}\mathbf {S} _{1i}\cdot \mathbf {S} _{2i}+J\sum _{\langle ij\rangle }\left(\mathbf {S} _{1i}\cdot \mathbf {S} _{1j}+\mathbf {S} _{2i}\cdot \mathbf {S} _{2j}\right)}$

using the correspondence ${\displaystyle \mathbf {L} _{i}=\mathbf {S} _{1i}+\mathbf {S} _{2i}}$^[1]

The particular case of quantum rotor model which has the O(2) symmetry can be used to describe a superconducting array of Josephson junctions or the behavior of bosons in optical lattices.^[3] Another specific case of O(3) symmetry is equivalent to a system of two layers (bilayer) of a quantum Heisenberg antiferromagnet; it can also describe double-layer quantum Hall ferromagnets.^[3] It can also be shown that the phase transition for the two dimensional rotor model has the same universality class as that of antiferromagnetic Heisenberg spin models.^[4]

See also

• Heisenberg model (quantum)
• Ising model

References