Quantum clock model explained

The quantum clock model is a quantum lattice model.^[1] It is a generalisation of the transverse-field Ising model . It is defined on a lattice with

states on each site. The Hamiltonian of this model is

H=-J\left(\sum

	\dagger
(Z
	i

Z_j+Z_i

	\dagger
Z
	j

)+g\sum_j(X_j+

	\dagger
X
	j)

\right)

Here, the subscripts refer to lattice sites, and the sum

\sum_\langle

is done over pairs of nearest neighbour sites

and

. The clock matrices

X_j

and

Z_j

are

N x N

generalisations of the Pauli matrices satisfying

Z_jX_k=

	2\pii	\delta_j,k
	N

X_kZ_j

and

	N
X
	j

	N
Z
	j

where

\delta_j,k

is 1 if

and

are the same site and zero otherwise.

is a prefactor with dimensions of energy, and

is another coupling coefficient that determines the relative strength of the external field compared to the nearest neighbor interaction.

The model obeys a global

Z_N

symmetry, which is generated by the unitary operator

U_X=\prod_jX_j

where the product is over every site of the lattice. In other words,

U_X

commutes with the Hamiltonian.

When

N=2

the quantum clock model is identical to the transverse-field Ising model. When

N=3

the quantum clock model is equivalent to the quantum three-state Potts model. When

N=4

, the model is again equivalent to the Ising model. When

N>4

, strong evidences have been found that the phase transitions exhibited in these models should be certain generalizations of Kosterlitz–Thouless transition, whose physical nature is still largely unknown.

One-dimensional model

There are various analytical methods that can be used to study the quantum clock model specifically in one dimension.

Kramers–Wannier duality

A nonlocal mapping of clock matrices known as the Kramers–Wannier duality transformation can be done as follows:^[2] $\begin\tilde &= Z^\dagger_j Z_ \\\tilde^\dagger_j \tilde_ &= X_ \end$ Then, in terms of the newly defined clock matrices with tildes, which obey the same algebraic relations as the original clock matrices, the Hamiltonian is simply

H=-Jg\sum_j(

	\dagger
\tilde{Z}
	j

\tilde{Z}_j+1+g^-1

	\dagger
\tilde{X}
	j

+rm{h.c.})

. This indicates that the model with coupling parameter

is dual to the model with coupling parameter

g^-1

, and establishes a duality between the ordered phase and the disordered phase.

Note that there are some subtle considerations at the boundaries of the one dimensional chain; as a result of these, the degeneracy and

Z_N

symmetry properties of phases are changed under the Kramers–Wannier duality. A more careful analysis involves coupling the theory to a

Z_N

gauge field; fixing the gauge reproduces the results of the Kramers Wannier transformation.

Phase transition

For

N=2,3,4

, there is a unique phase transition from the ordered phase to the disordered phase at

g=1

. The model is said to be "self-dual" because Kramers–Wannier transformation transforms the Hamiltonian to itself. For

N>4

, there are two phase transition points at

g_1<1

and

g_2=1/g_1>1

. Strong evidences have been found that these phase transitions should be a class of generalizations^[3] of Kosterlitz–Thouless transition. The KT transition predicts that the free energy has an essential singularity that goes like

e^-\tfrac{c{\sqrt{|g-g_c|}}}

, while perturbative study found that the essential singularity behaves as

e^-\tfrac{c

	\sigma}}
{\|g-g
	c\|

where

\sigma

goes from

0.2

0.5

increases from

. The physical pictures^[4] of these phase transitions are still not clear.

Jordan–Wigner transformation

Another nonlocal mapping known as the Jordan Wigner transformation can be used to express the theory in terms of parafermions.

Notes and References

1809.07757. Radicevic. Djordje. Spin Structures and Exact Dualities in Low Dimensions. 2018. hep-th.
1809.07757. Radicevic. Djordje. Spin Structures and Exact Dualities in Low Dimensions. 2018. hep-th.
Bingnan Zhang . Perturbative study of the one-dimensional quantum clock model . Phys. Rev. E . 2020 . 102 . 4 . 042110 . 10.1103/PhysRevE.102.042110 . 33212691 . 2006.11361 . 2020PhRvE.102d2110Z . 219966942 .
Martin B. Einhorn, Robert Savit, Eliezer Rabinovici . A physical picture for the phase transitions in Zn symmetric models. . Nuclear Physics B . 1980 . 170 . 1 . 16-31 . 10.1016/0550-3213(80)90473-3 . 1980NuPhB.170...16E . 2027.42/23169 . free .