Generating tight-binding models

See also

The complete source code of this example can be found in bloch_generator.py. A Jupyter notebook can be found in bloch_generator.ipynb.

In addition to finding the symmetry group of a given Hamiltonian, Qsymm can also generate a class of models that have a given symmetry. In this tutorial we will work through a few pertinent examples to show how we can use Qsymm to generate a tight-binding model from symmetry constraints.

Graphene

First we’re going to generate the spinless nearest-neighbor tight-binding Hamiltonian for graphene.

The generators of the symmetry group are time-reversal symmetry, sublattice (or chiral) symmetry, and threefold rotation symmetry.

# Time reversal
TR = qsymm.time_reversal(2, U=np.eye(2))

# Chiral symmetry
C = qsymm.chiral(2, U=np.array([[1, 0], [0, -1]]))

# Atom A rotates into A, B into B.
# We use sympy to get an exact representation of the multiplying factors
sphi = (2 / 3) * sympy.pi

C3 = qsymm.PointGroupElement(
    sympy.Matrix([
        [sympy.cos(sphi), -sympy.sin(sphi)],
        [sympy.sin(sphi), sympy.cos(sphi)]
    ]),
    U=np.eye(2),
)

symmetries = [C, TR, C3]

There are two carbon atoms per unit cell (A and B) with one orbital each. The lattice is triangular, and only includes hoppings between nearest neighbour atoms. This restricts hoppings to only those between atoms of different types, such that each atom couples to three neighbouring atoms.

Using the symmetrization strategy to generate the Hamiltonian, it is sufficient to specify hoppings to one such neighbour along with the symmetry generators, and we take the vector \((1,0)\) to connect this neighbouring pair of atoms.

norbs = [('A', 1), ('B', 1)]  # A and B atom per unit cell, one orbital each
hopping_vectors = [('A', 'B', [0, 1])]  # Hopping between neighbouring A and B atoms

Now we generate the hamiltonian using bloch_family:

family = qsymm.bloch_family(hopping_vectors, symmetries, norbs)
qsymm.display_family(family)

\[\begin{split}\displaystyle \left[\begin{matrix}0 & e^{i k_{y}} + e^{- \frac{i k_{y} \sin^{2}{\left(0.666666666666667 \pi \right)}}{\cos^{4}{\left(0.666666666666667 \pi \right)} + 2 \sin^{2}{\left(0.666666666666667 \pi \right)} \cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{4}{\left(0.666666666666667 \pi \right)}}} e^{\frac{i k_{y} \cos^{2}{\left(0.666666666666667 \pi \right)}}{\cos^{4}{\left(0.666666666666667 \pi \right)} + 2 \sin^{2}{\left(0.666666666666667 \pi \right)} \cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{4}{\left(0.666666666666667 \pi \right)}}} e^{- \frac{2 i k_{x} \sin{\left(0.666666666666667 \pi \right)} \cos{\left(0.666666666666667 \pi \right)}}{\cos^{4}{\left(0.666666666666667 \pi \right)} + 2 \sin^{2}{\left(0.666666666666667 \pi \right)} \cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{4}{\left(0.666666666666667 \pi \right)}}} + e^{- \frac{i k_{x} \sin{\left(0.666666666666667 \pi \right)}}{\cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{2}{\left(0.666666666666667 \pi \right)}}} e^{\frac{i k_{y} \cos{\left(0.666666666666667 \pi \right)}}{\cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{2}{\left(0.666666666666667 \pi \right)}}}\\e^{\frac{i k_{x} \sin{\left(0.666666666666667 \pi \right)}}{\cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{2}{\left(0.666666666666667 \pi \right)}}} e^{- \frac{i k_{y} \cos{\left(0.666666666666667 \pi \right)}}{\cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{2}{\left(0.666666666666667 \pi \right)}}} + e^{\frac{i k_{y} \sin^{2}{\left(0.666666666666667 \pi \right)}}{\cos^{4}{\left(0.666666666666667 \pi \right)} + 2 \sin^{2}{\left(0.666666666666667 \pi \right)} \cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{4}{\left(0.666666666666667 \pi \right)}}} e^{- \frac{i k_{y} \cos^{2}{\left(0.666666666666667 \pi \right)}}{\cos^{4}{\left(0.666666666666667 \pi \right)} + 2 \sin^{2}{\left(0.666666666666667 \pi \right)} \cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{4}{\left(0.666666666666667 \pi \right)}}} e^{\frac{2 i k_{x} \sin{\left(0.666666666666667 \pi \right)} \cos{\left(0.666666666666667 \pi \right)}}{\cos^{4}{\left(0.666666666666667 \pi \right)} + 2 \sin^{2}{\left(0.666666666666667 \pi \right)} \cos^{2}{\left(0.666666666666667 \pi \right)} + \sin^{4}{\left(0.666666666666667 \pi \right)}}} + e^{- i k_{y}} & 0\end{matrix}\right]\end{split}\]

Scale the bond length in terms of the graphene lattice constant, and have the function return a list of BlochModel objects. For this we can use a more convenient definition of the rotation

C3 = qsymm.rotation(1/3, U=np.eye(2))
symmetries = [C, TR, C3]

norbs = [('A', 1), ('B', 1)]
hopping_vectors = [('A', 'B', [0, 1/np.sqrt(3)])]

family = qsymm.bloch_family(hopping_vectors, symmetries, norbs, bloch_model=True)
qsymm.display_family(family)

\[\begin{split}\displaystyle \left[\begin{matrix}0 & e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{6}} + e^{\frac{\sqrt{3} i k_{y}}{3}} + e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{6}}\\e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{6}} + e^{- \frac{\sqrt{3} i k_{y}}{3}} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{6}} & 0\end{matrix}\right]\end{split}\]

Three-orbital tight-binding model for monolayer \(MX_2\)

We use the Hamiltonian generator to reproduce the tight binding model for monolayer \(MX_2\) published in Phys. Rev. B 88, 085433 (2013).

The generators of the symmetry group of the tight binding model are time reversal symmetry, mirror symmetry and threefold rotation symmetry.

# Time reversal
TR = qsymm.time_reversal(2, np.eye(3))

# Mirror symmetry
Mx = qsymm.mirror([1, 0], np.diag([1, -1, 1]))

# Threefold rotation on d_z^2, d_xy, d_x^2-y^2 states.
C3U = np.array([
    [1, 0, 0],
    [0, -0.5, -np.sqrt(3)/2],
    [0, np.sqrt(3)/2, -0.5]
])

# Could also use the predefined representation of rotations on d-orbitals
Ld = qsymm.groups.L_matrices(3, 2)
C3U2 = qsymm.groups.spin_rotation(2 * np.pi * np.array([0, 0, 1/3]), Ld)

# Restrict to d_z^2, d_xy, d_x^2-y^2 states
mask = np.array([1, 2 ,0])
C3U2 = C3U2[mask][:, mask]

assert np.allclose(C3U, C3U2)

C3 = qsymm.rotation(1/3, U=C3U)

symmetries = [TR, Mx, C3]

Next, we specify the hoppings to include. The tight binding model has a triangular lattice, three orbitals per M atom, and nearest neighbour hopping.

# One site per unit cell (M atom), with three orbitals
norbs = [('a', 3)]

Each atom has six nearest neighbour atoms at a distance of one primitive lattice vector. Since we use the symmetrization strategy to generate the Hamiltonian, it is sufficient to specify a hopping to one nearest neighbour atom along with the symmetry generators. We take the primitive vector connecting the pair of atoms to be \((1,0)\).

# Hopping to a neighbouring atom one primitive lattice vector away
hopping_vectors = [('a', 'a', [1, 0])]

We again use bloch_family to generate the tight-binding Hamiltonian:

family = qsymm.bloch_family(hopping_vectors, symmetries, norbs, bloch_model=True)

The Hamiltonian family should include 8 linearly independent components, including the onsite terms.

len(family)

8

qsymm.display_family(family)

\[\begin{split}\displaystyle \left[\begin{matrix}1 & 0 & 0\\0 & 0 & 0\\0 & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0\\0 & 1 & 0\\0 & 0 & 1\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} + e^{i k_{x}} + e^{- i k_{x}} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} & 0 & 0\\0 & 0 & 0\\0 & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & - e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + \frac{e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2} - \frac{e^{i k_{x}}}{2} + \frac{e^{- i k_{x}}}{2} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} - \frac{e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2} & \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2} - \frac{\sqrt{3} e^{i k_{x}}}{2} - \frac{\sqrt{3} e^{- i k_{x}}}{2} + \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2}\\- \frac{e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} + e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} + \frac{e^{i k_{x}}}{2} - \frac{e^{- i k_{x}}}{2} + \frac{e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} - e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} & 0 & 0\\\frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} - \frac{\sqrt{3} e^{i k_{x}}}{2} - \frac{\sqrt{3} e^{- i k_{x}}}{2} + \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2} + \frac{\sqrt{3} e^{i k_{x}}}{2} - \frac{\sqrt{3} e^{- i k_{x}}}{2} - \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2} & e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} - \frac{e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2} - \frac{e^{i k_{x}}}{2} - \frac{e^{- i k_{x}}}{2} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} - \frac{e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{2}\\- \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} - \frac{\sqrt{3} e^{i k_{x}}}{2} + \frac{\sqrt{3} e^{- i k_{x}}}{2} + \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} & 0 & 0\\- \frac{e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} + e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} - \frac{e^{i k_{x}}}{2} - \frac{e^{- i k_{x}}}{2} - \frac{e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{2} + e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0\\0 & e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} + e^{i k_{x}} + e^{- i k_{x}} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} & 0\\0 & 0 & e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} + e^{i k_{x}} + e^{- i k_{x}} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0\\0 & - \frac{\sqrt{3} e^{i k_{x}}}{2} - \frac{\sqrt{3} e^{- i k_{x}}}{2} & - e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + \frac{e^{i k_{x}}}{2} - \frac{e^{- i k_{x}}}{2} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}\\0 & e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} - \frac{e^{i k_{x}}}{2} + \frac{e^{- i k_{x}}}{2} - e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} & - \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{3} - \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{3} + \frac{\sqrt{3} e^{i k_{x}}}{6} + \frac{\sqrt{3} e^{- i k_{x}}}{6} - \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{3} - \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{3}\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0\\0 & - \frac{\sqrt{3} e^{i k_{x}}}{2} - \frac{\sqrt{3} e^{- i k_{x}}}{2} & e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}} - \frac{e^{i k_{x}}}{2} + \frac{e^{- i k_{x}}}{2} - e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}\\0 & - e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} + \frac{e^{i k_{x}}}{2} - \frac{e^{- i k_{x}}}{2} + e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}} & - \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{3} - \frac{\sqrt{3} e^{\frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{3} + \frac{\sqrt{3} e^{i k_{x}}}{6} + \frac{\sqrt{3} e^{- i k_{x}}}{6} - \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{\frac{\sqrt{3} i k_{y}}{2}}}{3} - \frac{\sqrt{3} e^{- \frac{i k_{x}}{2}} e^{- \frac{\sqrt{3} i k_{y}}{2}}}{3}\end{matrix}\right]\end{split}\]

4-site model for monolayer \(WTe_2\)

We use the Hamiltonian generator to reproduce the tight binding model for monolayer WTe2 published in Phys. Rev. X 6, 041069 (2016).

The generators of the symmetry group of the tight binding model are time reversal symmetry, glide reflection and inversion symmetry.

# Define 4 sites with one orbital each
sites = ['Ad', 'Ap', 'Bd', 'Bp']
norbs = [(site, 1) for site in sites]

# Define symbolic coordinates for orbitals
rAp = qsymm.sympify('[x_Ap, y_Ap]')
rAd = qsymm.sympify('[x_Ad, y_Ad]')
rBp = qsymm.sympify('[x_Bp, y_Bp]')
rBd = qsymm.sympify('[x_Bd, y_Bd]')

# Define hoppings to include
hopping_vectors = [
    ('Bd', 'Bd', np.array([1, 0])),
    ('Ap', 'Ap', np.array([1, 0])),
    ('Bd', 'Ap', rAp - rBd),
    ('Ap', 'Bp', rBp - rAp),
    ('Ad', 'Bd', rBd - rAd),
]

# Inversion
perm_inv = {'Ad': 'Bd', 'Ap': 'Bp', 'Bd': 'Ad', 'Bp': 'Ap'}
onsite_inv = {site: (1 if site in ['Ad', 'Bd'] else -1) * np.eye(1) for site in sites}
inversion = qsymm.groups.symmetry_from_permutation(-np.eye(2), perm_inv, norbs, onsite_inv)

# Glide
perm_glide = {site: site for site in sites}
onsite_glide = {site: (1 if site in ['Ad', 'Bd'] else -1) * np.eye(1) for site in sites}
glide = qsymm.groups.symmetry_from_permutation(np.array([[-1, 0],[0, 1]]), perm_glide, norbs, onsite_glide)

# TR
time_reversal = qsymm.time_reversal(2, np.eye(4))

generators = {glide, inversion, time_reversal}
sg = qsymm.groups.generate_group(generators)

Again we generate the tight-binding Hamiltonian:

family = qsymm.bloch_family(hopping_vectors, generators, norbs=norbs)
qsymm.display_family(family)

\[\begin{split}\displaystyle \left[\begin{matrix}1 & 0 & 0 & 0\\0 & 0 & 0 & 0\\0 & 0 & 1 & 0\\0 & 0 & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0 & 0\\0 & 1 & 0 & 0\\0 & 0 & 0 & 0\\0 & 0 & 0 & 1\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0 & 0\\0 & 0 & 0 & e^{i k_{x} x_{Ap}} e^{- i k_{x} x_{Bp}} e^{- i k_{y} y_{Ap}} e^{i k_{y} y_{Bp}} + e^{- i k_{x} x_{Ap}} e^{i k_{x} x_{Bp}} e^{- i k_{y} y_{Ap}} e^{i k_{y} y_{Bp}}\\0 & 0 & 0 & 0\\0 & e^{i k_{x} x_{Ap}} e^{- i k_{x} x_{Bp}} e^{i k_{y} y_{Ap}} e^{- i k_{y} y_{Bp}} + e^{- i k_{x} x_{Ap}} e^{i k_{x} x_{Bp}} e^{i k_{y} y_{Ap}} e^{- i k_{y} y_{Bp}} & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & e^{i k_{x} x_{Ad}} e^{- i k_{x} x_{Bd}} e^{- i k_{y} y_{Ad}} e^{i k_{y} y_{Bd}} + e^{- i k_{x} x_{Ad}} e^{i k_{x} x_{Bd}} e^{- i k_{y} y_{Ad}} e^{i k_{y} y_{Bd}} & 0\\0 & 0 & 0 & 0\\e^{i k_{x} x_{Ad}} e^{- i k_{x} x_{Bd}} e^{i k_{y} y_{Ad}} e^{- i k_{y} y_{Bd}} + e^{- i k_{x} x_{Ad}} e^{i k_{x} x_{Bd}} e^{i k_{y} y_{Ad}} e^{- i k_{y} y_{Bd}} & 0 & 0 & 0\\0 & 0 & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0 & e^{i k_{x} x_{Ap}} e^{- i k_{x} x_{Bd}} e^{- i k_{y} y_{Ap}} e^{i k_{y} y_{Bd}} - e^{- i k_{x} x_{Ap}} e^{i k_{x} x_{Bd}} e^{- i k_{y} y_{Ap}} e^{i k_{y} y_{Bd}}\\0 & 0 & - e^{i k_{x} x_{Ap}} e^{- i k_{x} x_{Bd}} e^{- i k_{y} y_{Ap}} e^{i k_{y} y_{Bd}} + e^{- i k_{x} x_{Ap}} e^{i k_{x} x_{Bd}} e^{- i k_{y} y_{Ap}} e^{i k_{y} y_{Bd}} & 0\\0 & e^{i k_{x} x_{Ap}} e^{- i k_{x} x_{Bd}} e^{i k_{y} y_{Ap}} e^{- i k_{y} y_{Bd}} - e^{- i k_{x} x_{Ap}} e^{i k_{x} x_{Bd}} e^{i k_{y} y_{Ap}} e^{- i k_{y} y_{Bd}} & 0 & 0\\- e^{i k_{x} x_{Ap}} e^{- i k_{x} x_{Bd}} e^{i k_{y} y_{Ap}} e^{- i k_{y} y_{Bd}} + e^{- i k_{x} x_{Ap}} e^{i k_{x} x_{Bd}} e^{i k_{y} y_{Ap}} e^{- i k_{y} y_{Bd}} & 0 & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}e^{i k_{x}} + e^{- i k_{x}} & 0 & 0 & 0\\0 & 0 & 0 & 0\\0 & 0 & e^{i k_{x}} + e^{- i k_{x}} & 0\\0 & 0 & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & 0 & 0\\0 & e^{i k_{x}} + e^{- i k_{x}} & 0 & 0\\0 & 0 & 0 & 0\\0 & 0 & 0 & e^{i k_{x}} + e^{- i k_{x}}\end{matrix}\right]\end{split}\]

Square lattice with 4 sites in the unit cell

Now we’re going to make a model with square lattice that has 4 sites in the unit cell related by 4-fold rotation. Sites have spin-1/2 and we add time reversal and particle-hole symmetry.

hopping_vectors = [
    ('a', 'b', np.array([1, 0])),
    ('b', 'a', np.array([1, 0])),
    ('c', 'd', np.array([1, 0])),
    ('d', 'c', np.array([1, 0])),
    ('a', 'c', np.array([0, 1])),
    ('c', 'a', np.array([0, 1])),
    ('b', 'd', np.array([0, 1])),
    ('d', 'b', np.array([0, 1])),
]

# Define spin-1/2 operators
S = qsymm.groups.spin_matrices(1/2)
# Define real space rotation generators in 2D
L = qsymm.groups.L_matrices(d=2)

sites = ['a', 'b', 'c', 'd']
norbs = [(site, 2) for site in sites]

perm_C4 = {'a': 'b', 'b': 'd', 'd': 'c', 'c': 'a'}
onsite_C4 = {site: qsymm.groups.spin_rotation(2*np.pi * np.array([0, 0, 1/4]), S) for site in sites}
C4 = qsymm.groups.symmetry_from_permutation(
    qsymm.groups.spin_rotation(2*np.pi * np.array([1/4]), L, roundint=True),
    perm_C4,
    norbs,
    onsite_C4,
)

# Fermionic time-reversal
time_reversal = qsymm.time_reversal(
    2,
    np.kron(np.eye(4),
    qsymm.groups.spin_rotation(2*np.pi * np.array([0, 1/2, 0]), S)),
)

# define strange PH symmetry
particle_hole = qsymm.particle_hole(2, np.eye(8))

generators = {C4, time_reversal, particle_hole}
sg = qsymm.groups.generate_group(generators)

Once again we generate the tight-binding Hamiltonian:

family = qsymm.bloch_family(hopping_vectors, generators, norbs=norbs)
qsymm.display_family(family)

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & - i e^{i k_{x}} & 0 & i e^{- i k_{y}} & 0 & 0 & 0\\0 & 0 & 0 & i e^{i k_{x}} & 0 & - i e^{- i k_{y}} & 0 & 0\\i e^{- i k_{x}} & 0 & 0 & 0 & 0 & 0 & - i e^{- i k_{y}} & 0\\0 & - i e^{- i k_{x}} & 0 & 0 & 0 & 0 & 0 & i e^{- i k_{y}}\\- i e^{i k_{y}} & 0 & 0 & 0 & 0 & 0 & i e^{i k_{x}} & 0\\0 & i e^{i k_{y}} & 0 & 0 & 0 & 0 & 0 & - i e^{i k_{x}}\\0 & 0 & i e^{i k_{y}} & 0 & - i e^{- i k_{x}} & 0 & 0 & 0\\0 & 0 & 0 & - i e^{i k_{y}} & 0 & i e^{- i k_{x}} & 0 & 0\end{matrix}\right]\end{split}\]

\[\begin{split}\displaystyle \left[\begin{matrix}0 & 0 & i e^{- i k_{x}} & 0 & - i e^{i k_{y}} & 0 & 0 & 0\\0 & 0 & 0 & - i e^{- i k_{x}} & 0 & i e^{i k_{y}} & 0 & 0\\- i e^{i k_{x}} & 0 & 0 & 0 & 0 & 0 & i e^{i k_{y}} & 0\\0 & i e^{i k_{x}} & 0 & 0 & 0 & 0 & 0 & - i e^{i k_{y}}\\i e^{- i k_{y}} & 0 & 0 & 0 & 0 & 0 & - i e^{- i k_{x}} & 0\\0 & - i e^{- i k_{y}} & 0 & 0 & 0 & 0 & 0 & i e^{- i k_{x}}\\0 & 0 & - i e^{- i k_{y}} & 0 & i e^{i k_{x}} & 0 & 0 & 0\\0 & 0 & 0 & i e^{- i k_{y}} & 0 & - i e^{i k_{x}} & 0 & 0\end{matrix}\right]\end{split}\]