Supercurrent through a quantum dot#

In this tutorial, we demonstrate how to use Pymablock to compute complicated analytical expressions and block-diagonalize Hamiltonians with more than two subspaces. Directly running Pymablock on a large symbolic Hamiltonian is computationally expensive, and simplifying the inputs and outputs is crucial to obtaining interpretable results in a reasonable amount of time. Doing so benefits from physical insight and requires manipulation of symbolic expressions.

As an example, we compute supercurrent between two superconductors weakly coupled through a quantum dot.

Two superconductors and a quantum dot

We compute the supercurrent by treating the tunneling to the quantum dot as a perturbation. This requires calculating and manipulating fourth-order corrections in tunneling to the ground state energy [1].

Define the Hamiltonian#

The Hamiltonian of the system is

\[ H = H_{\textrm{SC}}+ H_{\textrm{dot}} + H_{T}, \]

where the Hamiltonians of the superconductors, of the quantum dot, and of the tunnel coupling are

\[\begin{split} H_{\textrm{SC}} = \sum_{\alpha=L, R} \xi_{\alpha} \left( n_{\alpha \uparrow} + n_{\alpha \downarrow} \right) + \Gamma_{\alpha} \left( c_{\alpha, \uparrow}^\dagger c_{\alpha \downarrow}^\dagger + c_{\alpha \downarrow} c_{\alpha, \uparrow} \right), \\ H_{\textrm{dot}} = \frac{U}{2} \left( n_{\uparrow} + n_{\downarrow} - N \right)^2. \\ H_{T} = \sum_{\alpha=L,R} t_\alpha \left( c_{\alpha \uparrow}^\dagger d_{\uparrow} + c_{\alpha \downarrow}^\dagger d_{\downarrow} \right) + \textrm{h.c.}. \end{split}\]

Here \(c_{\alpha, \sigma}\) and \(d_{\sigma}\) are the annihilation operators of electrons in the left (L) and right (R) superconductors and quantum dot, respectively, with \(\sigma = \uparrow, \downarrow\). The superconductors’ onsite energies are \(\xi_{\alpha}\), and their pairing amplitudes are \(\Gamma_{\alpha}\). The quantum dot’s charging energy is \(U\). The offset number of electrons \(N = CV_g/e\) is controlled by the gate voltage \(V_g\). The couplings between the quantum dot and the superconductors are \(t_{L} = \lvert t_{L} \rvert e^{i \phi}\) and \(t_{R} = \lvert t_{R} \rvert\), where \(\phi\) is the phase difference between the superconductors. We treat both couplings as independent perturbations.

We start by importing the necessary libraries and defining the symbols and operators in the Hamiltonian.

from IPython.display import display
import numpy as np
import sympy
from sympy import exp, I, symbols, Symbol, Eq
from sympy.physics.quantum.fermion import FermionOp
from sympy.physics.quantum import Dagger

from pymablock import block_diagonalize

# Hamiltonian parameters
U, N = symbols(r"U N", positive=True)
xis = xi_L, xi_R = symbols(r"\xi_L \xi_R", positive=True)
Gammas = Gamma_L, Gamma_R = symbols(r"\Gamma_L \Gamma_R", positive=True)
ts = t_L_complex, t_R = Symbol("t_Lc", real=False), Symbol("t_R", real=True)

# Dot operators
c_up, c_down = FermionOp(r'c_{d, \uparrow}'), FermionOp(r'c_{d, \downarrow}')

# Superconductor operators
d_ups = FermionOp(r'd_{L, \uparrow}'), FermionOp(r'd_{R, \uparrow}')
d_downs = FermionOp(r'd_{L, \downarrow}'), FermionOp(r'd_{R, \downarrow}')

# Only used for printing. Because sympy forces lexicographic ordering,
# we prepend {} for h.c. to appear last.
hc = sympy.Symbol(r"{}\textrm{h.c.}")

def n(op):
    """Shorthand for Dagger(op) * op"""
    return Dagger(op) * op

def display_eq(title, expr):
    """Print a sympy expression as an equality."""
    display(Eq(sympy.Symbol(title), expr))

Here we use t_L_complex to avoid complications with simplification routines in sympy, so that \(\exp i \phi\) is not expanded into a sine and cosine.

Next, we define the Hamiltonians of quantum dot and tunneling.

# Quantum Dot Hamiltonian
H_dot = U * (n(c_up) + n(c_down) - N)**2 / 2

# Tunneling Hamiltonian
H_T = sum(t * (Dagger(c_up) * d_up + Dagger(c_down) * d_down)
    for t, d_up, d_down in zip(ts, d_ups, d_downs)
)  # + h.c. added later

\[\displaystyle H_{dot} = \frac{U \left(- N + {{c_{d, \downarrow}}^\dagger} {c_{d, \downarrow}} + {{c_{d, \uparrow}}^\dagger} {c_{d, \uparrow}}\right)^{2}}{2}\]

\[\displaystyle H_{T} = t_{Lc} \left({{c_{d, \downarrow}}^\dagger} {d_{L, \downarrow}} + {{c_{d, \uparrow}}^\dagger} {d_{L, \uparrow}}\right) + t_{R} \left({{c_{d, \downarrow}}^\dagger} {d_{R, \downarrow}} + {{c_{d, \uparrow}}^\dagger} {d_{R, \uparrow}}\right) + {}\textrm{h.c.}\]

Apply the Bogoliubov transformation#

While \(H_{\textrm{dot}}\) is already diagonal, the superconductors’ Hamiltonian \(H_{SC}\) is not. Therefore, we apply the Bogoliubov transformation to \(H_{SC}\), such that the entire unperturbed Hamiltonian \(H_0 = H_{SC} + H_{\textrm{dot}}\) is diagonal.

Avoid symbolic diagonalization

Diagonalizing a large symbolic Hamiltonian is computationally expensive, and in many cases impossible. To alleviate this, we use physical insight: with the Bogoliubov transformation we get a diagonal unperturbed Hamiltonian.

We define the superconductors’ Hamiltonian using the Bogoliubov quasi-particle operators \(f_{\alpha, \sigma}\), which are related to the original operators \(c_{\alpha, \sigma}\) by the Bogoliubov transformation:

\[\begin{split} f_{\alpha, \uparrow} = u_\alpha c_{\alpha, \uparrow} + v_\alpha c_{\alpha, \downarrow} \\ f_{\alpha, \downarrow} = u_\alpha c_{\alpha, \downarrow} - v_\alpha c_{\alpha, \uparrow} \end{split}\]

where \(u_\alpha\) and \(v_\alpha\) are complex coefficients that satisfy \(\lvert u_\alpha \rvert^2 + \lvert v_\alpha \rvert^2 = 1\). As a result,

\[ H_{SC} = \sum_{\alpha=L, R} \xi_{\alpha} - E_{\alpha} + E_{\alpha} \left( f_{\alpha, \uparrow}^\dagger f_{\alpha, \uparrow} + f_{\alpha, \downarrow}^\dagger f_{\alpha, \downarrow} \right), \]

where \(E_{\alpha} = \sqrt{\Gamma_{\alpha}^2 + \xi_{\alpha}^2}\) are the Andreev bound state energies, and \(\lvert u_{\alpha} \rvert = \sqrt{\frac{E_{\alpha} + \xi_{\alpha}}{2 E_{\alpha}}}\) and \(\lvert v_{\alpha} \rvert = \sqrt{\frac{E_{\alpha} - \xi_{\alpha}}{2 E_{\alpha}}}\) are the Bogoliubov coefficients.

Avoid square roots

Using square roots leads to complicated expressions, because assumptions about the arguments of square roots are not automatically inferred by sympy. For example, \(\sqrt{a^2}\) is not equivalent to \(a\), but rather \(\lvert a \rvert\). To avoid lengthy expressions from unsimplified expressions with square roots, we replace them with \(E_{\alpha}\), \(u_{\alpha}\), and \(v_{\alpha}\). These will appear in the effective Hamiltonian, so we substitute their values at the end of the calculation.

# Superconductors' energies
Es = E_L, E_R = symbols(r"E_L E_R", positive=True)

# Bogoliubov quasiparticle operators
f_ups = FermionOp('f_{L, \\uparrow}'), FermionOp('f_{R, \\uparrow}')
f_downs = FermionOp('f_{L, \\downarrow}'), FermionOp('f_{R, \\downarrow}')

# Superconductors' Hamiltonian
H_sc = sum(
    xi - E + E * n(f_up) + E * n(f_down)
    for xi, E, f_up, f_down in zip(xis, Es, f_ups, f_downs)
)

\[\displaystyle H_{SC} = - E_{L} + E_{L} {{f_{L, \downarrow}}^\dagger} {f_{L, \downarrow}} + E_{L} {{f_{L, \uparrow}}^\dagger} {f_{L, \uparrow}} - E_{R} + E_{R} {{f_{R, \downarrow}}^\dagger} {f_{R, \downarrow}} + E_{R} {{f_{R, \uparrow}}^\dagger} {f_{R, \uparrow}} + \xi_{L} + \xi_{R}\]

Similarly, because the \(H_T\) depends on \(d_{\sigma}\), we apply the Bogoliubov transformation to it as well.

# Bogoliubov coefficients
us = u_L, u_R = symbols(r"u_L u_R", real=True)
vs = v_L, v_R = symbols(r"v_L v_R", real=True)

# Bogoliubov transformation from d operators to f operators
d_subs = {}
for u, v, d_down, d_up, f_down, f_up in zip(us, vs, d_downs, d_ups, f_downs, f_ups):
    d_subs[d_up] = u * f_up - v * Dagger(f_down)
    d_subs[d_down] = u * f_down + v * Dagger(f_up)
    d_subs[Dagger(d_up)] = Dagger(d_subs[d_up])
    d_subs[Dagger(d_down)] = Dagger(d_subs[d_down])

# Substitute d operators with f operators
H_T = H_T.subs(d_subs).expand()  # + h.c., expand to open up parentheses

# Total Hamiltonian
H = H_sc + H_dot + H_T + Dagger(H_T)

\[\displaystyle H_{T} = t_{Lc} u_{L} {{c_{d, \downarrow}}^\dagger} {f_{L, \downarrow}} + t_{Lc} u_{L} {{c_{d, \uparrow}}^\dagger} {f_{L, \uparrow}} + t_{Lc} v_{L} {{c_{d, \downarrow}}^\dagger} {{f_{L, \uparrow}}^\dagger} - t_{Lc} v_{L} {{c_{d, \uparrow}}^\dagger} {{f_{L, \downarrow}}^\dagger} + t_{R} u_{R} {{c_{d, \downarrow}}^\dagger} {f_{R, \downarrow}} + t_{R} u_{R} {{c_{d, \uparrow}}^\dagger} {f_{R, \uparrow}} + t_{R} v_{R} {{c_{d, \downarrow}}^\dagger} {{f_{R, \uparrow}}^\dagger} - t_{R} v_{R} {{c_{d, \uparrow}}^\dagger} {{f_{R, \downarrow}}^\dagger} + {}\textrm{h.c.}\]

In this basis, the unperturbed Hamiltonian \(H = H_{\textrm{SC}}+ H_{\textrm{dot}}\) is diagonal.

Convert the Hamiltonian to a matrix#

One may apply Pymablock to this Hamiltonian directly, but it turns out to be too slow because Pymablock then fully diagonalizes the Hamiltonian symbolically in second quantization.

Instead, we convert the Hamiltonian to a matrix representation, split it into blocks, and only compute corrections to the few eigenenergies of interest. The following code cell defines a function to_matrix(...) that computes the matrix representation of a Hamiltonian H with fermionic operators and the corresponding basis. The details of the implementation are hidden for brevity.

Show code cell content Hide code cell content

from itertools import combinations

def to_matrix(H):
    """Compute a matrix representation of a sympy expression with fermion operators."""
    # Add an identity operator to all symbols so that we always work with operators
    H = H.subs({
        s: sympy.physics.quantum.IdentityOperator() * s for s in H.free_symbols
        if not isinstance(s, sympy.physics.quantum.Operator)
    })
    # Choose an order of fermionic operators
    fermions = [
        s for s in H.free_symbols
        if (
            isinstance(s, sympy.physics.quantum.fermion.FermionOp)
            and s.is_annihilation
        )
    ]
    fermions.sort(key=lambda f: f.name.name) # Sort by label to ensure consistent order
    # Compute matrix representations
    s_minus = sympy.Matrix([[0, 1], [0, 0]])
    s_z = sympy.Matrix([[1, 0], [0, -1]])
    s_0 = sympy.eye(2)
    matrix_subs = {
        op: sympy.kronecker_product(*(i * [s_z] + [s_minus] + (len(fermions) - i - 1) * [s_0]))
        for i, op in enumerate(fermions)
    }
    matrix_subs.update({Dagger(op): Dagger(mat) for op, mat in matrix_subs.items()})
    matrix_subs[sympy.physics.quantum.IdentityOperator()] = sympy.eye(2**len(fermions))

    # Generate basis
    basis = [(sympy.S.One,)]
    for n in range(len(fermions)):
        basis.extend(list(combinations(fermions, n + 1)))
    reversed_basis = list(reversed(basis))
    reversed_basis[-1] = (sympy.S.Zero,)

    basis_matrices = []
    for b, nb in zip(basis, reversed_basis):
        expr = [Dagger(op) * op for op in b]
        expr.extend([sympy.physics.quantum.IdentityOperator()-Dagger(op) * op for op in nb])
        basis_matrices.append(sympy.Mul(*expr).expand())
    basis_matrices = [b.subs(matrix_subs, simultaneous=True).expand() for b in basis_matrices]
    basis_order = [np.nonzero(np.array(b.diagonal(), dtype=int)[0])[0][0] for b in basis_matrices]
    basis = [sympy.Mul(*basis[i]) for i in np.argsort(basis_order)]
    return H.subs(matrix_subs, simultaneous=True).expand(), basis

Next, we obtain the matrix Hamiltonian and its basis.

%%time
# Compute Hamiltonian in matrix form
H, basis = to_matrix(H)

CPU times: user 3.3 s, sys: 7.91 ms, total: 3.31 s
Wall time: 3.31 s

At this point, we are ready to feed the \(64 \times 64\) symbolic Hamiltonian to the block-diagonalization routine of Pymablock. However, to improve the computational efficiency, we utilize the following observations:

The diagonal elements of the Hamiltonian will appear in the denominators in the effective Hamiltonian. These elements correspond to the dot energies \(E_n = U (n - N)^2 / 2\) and the energies of the superconductors \(E_{\alpha}\).
To compute supercurrent we will need to take the derivative of the effective Hamiltonian with respect to \(\phi\).
The Hamiltonian separates into two blocks corresponding to even and odd fermion parities.

To make the denominators simpler, we replace the dot energies with \(E_n\) right away. We then replace \(t_{L} = \lvert t_{L} \rvert e^{i (\phi + \delta \phi)}\) and introduce \(\delta\phi\) as an extra perturbative parameter. Computing a first order response to \(\delta \phi\) then directly gives the energy derivative.

t_L, phi, dphi = symbols(r"t_L \phi \delta\phi", positive=True)
H = H.subs({t_L_complex: t_L * exp(I * (phi + dphi))})

E_0, E_1, E_2 = symbols(r"E_0 E_1 E_2", positive=True)
E_0_value, E_1_value, E_2_value = [(U * (N - i)**2 / 2).expand() for i in range(3)]
H = H.subs({E_2_value: E_2}).subs({E_1_value: E_1}).subs({E_0_value: E_0})

Finally, the Hamiltonian is ready for further analysis.

Identify the ground states#

Before computing the effective Hamiltonian, we identify the ground state of the unperturbed Hamiltonian \(H_0\). The ground state depends on the offset electron number \(N\).

../_images/a29b16c064ac16a51294734b8a2447e6300ebc84809f7bed7a58c02ff37924e9.png

Therefore, we compute the supercurrent for the three regimes separately by considering the ground states with \(n=0, 1, 2\) electrons occupying the dot.

Compute the supercurrent perturbatively#

To compute the supercurrent,

\[ I = \frac{e}{\hbar} \frac{dE}{d\phi}, \]

we need to find the perturbed ground state energy \(E(\phi)\). To do so, we finally use Pymablock to compute the perturbative corrections to the ground state Hamiltonian. Because we are interested in different ground states, we define a separate subspace for \(n=0, 1, 2\). Additionally, to take advantage of the block-diagonal structure of the Hamiltonian, we define separate subspaces for even and odd parity sectors. This way, Pymablock avoids computing the matrix elements between states with different parities because they are zero. We handle the five subspaces separately by labeling each basis state in the input to the block-diagonalization routine with the corresponding subspace number.

%%time

ground_states = [sympy.S.One, c_up, c_down, c_up * c_down]  # vacuum state
subspaces = {
    sympy.S.One: 0,  # n=0
    c_up: 1,  # n=1
    c_down: 1,  # n=1
    c_down * c_up: 2,  # n=2
}
subspace_indices = [
    subspaces.get(element, 3 if len(element.free_symbols) % 2 else 4) for element in basis
]  # 3 for odd, 4 for even
H_tilde = block_diagonalize(H, subspace_indices=subspace_indices, symbols=[t_L, t_R, dphi])[0]

CPU times: user 1.52 s, sys: 0 ns, total: 1.52 s
Wall time: 1.52 s

subspace_indices is a list with 0 for every basis state that we include in the \(n=0\) subspace, 1 for the \(n=1\) subspace, 2 for the \(n=2\) subspace, 3 for the odd parity remaining states, and 4 for the even parity remaining states.

We start by finding the corrections to the ground state for \(n=0\), which is the vacuum state \(\lvert 0\rangle\). The first nonzero correction to the ground state energy appears in the order \(\mathcal{O}(t_L^2 t_R^2)\).

%%time
current = H_tilde[0, 0, 2, 2, 1][0, 0].subs({dphi: 1})

CPU times: user 3.53 s, sys: 3.97 ms, total: 3.53 s
Wall time: 3.53 s

We use the [0, 0] index to extract the ground state energy because for \(n=0, 2\) the Hamiltonian is a \(1 \times 1\) matrix, and for \(n=1\) it is a \(2 \times 2\) diagonal matrix with degenerate ground states. Here we also expand the energy to first order in \(\delta\phi\) and computed its prefactor by setting \(\delta\phi = 1\). This is an efficient alternative to computing the derivative of the Hamiltonian with respect to \(\phi\). It saves time and avoids unnecessary symbolic manipulations. The result, however, is still complicated and requires simplification.

Simplify the expression#

To simplify the supercurrent expression, we first identify common patterns:

The expression is formed by a sum of fractions.
Terms share common prefactors, which are good to factor out.
The numerators contain products of \(u_{\alpha} v_{\alpha}\), \(u_{\alpha}^2\), and \(v_{\alpha}^2\), all of which are free of square roots.

display_eq('I(n=0)', current)

\[\displaystyle I(n=0) = \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{- \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2} - \frac{t_{R} u_{R} \left(- \frac{t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{2} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{\frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2} - \frac{t_{R} u_{R} \left(\frac{t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{2} - \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{- \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2} - \frac{t_{R} u_{R} \left(- \frac{t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{2} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{\frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2} - \frac{t_{R} u_{R} \left(\frac{t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{2} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{- \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2} - \frac{t_{R} u_{R} \left(\frac{i t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{2} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{\frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{- i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{i \phi}}{2} - \frac{t_{R} u_{R} \left(- \frac{i t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{2} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{- \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} - \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2} - \frac{t_{R} u_{R} \left(\frac{i t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{2} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{\frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)^{2}} + \frac{i t_{L} t_{R}^{2} v_{L} v_{R}^{2} e^{i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} u_{L} \left(- \frac{t_{R}^{2} u_{R} v_{R}}{\left(E_{0} - E_{1} - E_{R}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{t_{R}^{2} u_{R} v_{R}}{- E_{1} + E_{2} - E_{R}} + \frac{t_{R}^{2} u_{R} v_{R}}{E_{0} - E_{1} - E_{R}}}{E_{0} - E_{2}}\right) e^{- i \phi}}{2} - \frac{t_{R} u_{R} \left(- \frac{i t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{- E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right)}{E_{0} - E_{2} - E_{L} - E_{R}} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} - \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right)}{2} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{R} v_{R} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right)}{2 \left(E_{0} - E_{1} - E_{R}\right)}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{2} - \frac{t_{R} v_{R} \left(- \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{R} u_{R} \left(\frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{- E_{1} + E_{2} - E_{L}} - \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{- \frac{i t_{L} u_{L} \left(- \frac{t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{- E_{L} - E_{R}} + \frac{t_{L} u_{L} \left(- \frac{i t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{- E_{L} - E_{R}} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} + \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} + \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{R} u_{R} \left(\frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{- E_{1} + E_{2} - E_{L}} - \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2}}{E_{0} - E_{1} - E_{R}}\right)}{2} + \frac{t_{R} v_{R} \left(\frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{R} u_{R} \left(\frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{- E_{1} + E_{2} - E_{L}} - \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{- \frac{i t_{L} u_{L} \left(\frac{t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{- E_{L} - E_{R}} + \frac{t_{L} u_{L} \left(\frac{i t_{L} t_{R} u_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} u_{R} v_{L} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{- E_{L} - E_{R}} - \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{- i \phi}}{2} - \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{- i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{R} u_{R} \left(\frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{- E_{1} + E_{2} - E_{L}} - \frac{2 i t_{L}^{2} u_{L} v_{L} e^{- 2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2}}{E_{0} - E_{1} - E_{R}}\right)}{2} + \frac{t_{R} v_{R} \left(- \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{R} u_{R} \left(- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{\frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{- E_{1} + E_{2} - E_{L}} + \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{i t_{L} u_{L} \left(\frac{t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{- E_{L} - E_{R}} + \frac{t_{L} u_{L} \left(- \frac{i t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{- E_{L} - E_{R}} + \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} + \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} + \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{R} u_{R} \left(- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{\frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{- E_{1} + E_{2} - E_{L}} + \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2}}{E_{0} - E_{1} - E_{R}}\right)}{2} - \frac{t_{R} v_{R} \left(\frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{R} u_{R} \left(- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{\frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{- E_{1} + E_{2} - E_{L}} + \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{\frac{i t_{L} u_{L} \left(- \frac{t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{- E_{L} - E_{R}} + \frac{t_{L} u_{L} \left(\frac{i t_{L} t_{R} u_{L} v_{R} e^{- i \phi}}{E_{0} - E_{1} - E_{R}} - \frac{i t_{L} t_{R} u_{R} v_{L} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{i \phi}}{- E_{L} - E_{R}} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{R}} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{i \phi}}{E_{0} - E_{1} - E_{L}}\right) e^{- i \phi}}{E_{0} - E_{2} - E_{L} - E_{R}} - \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right) \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right) \left(E_{0} - E_{1} - E_{R}\right)}\right) e^{i \phi}}{2} - \frac{i t_{L} v_{L} \left(- \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{i t_{L} v_{L} \left(\frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{L} v_{L} \left(- \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} - \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} + \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} + \frac{t_{L} v_{L} \left(\frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{R}\right)} + \frac{i t_{L} t_{R} u_{L} u_{R} e^{i \phi}}{2 \left(- E_{1} + E_{2} - E_{L}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{R}\right)} - \frac{i t_{L} t_{R} v_{L} v_{R} e^{- i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)}\right) e^{i \phi}}{2 \left(E_{0} - E_{1} - E_{L}\right)} - \frac{t_{R} u_{R} \left(- \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{\left(E_{0} - E_{1} - E_{L}\right) \left(- E_{1} + E_{2} - E_{L}\right)} + \frac{\frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{- E_{1} + E_{2} - E_{L}} + \frac{2 i t_{L}^{2} u_{L} v_{L} e^{2 i \phi}}{E_{0} - E_{1} - E_{L}}}{E_{0} - E_{2}}\right)}{2}}{E_{0} - E_{1} - E_{R}}\right)}{2}\]

Do not call simplify() on large expressions

Sympy provides several simplification routines, such as simplify(), expand(), factor(), and collect(), among others. The most general simplification routine is simplify(), which tries a combination of simplification routines to the expression. However, this routine can be unnecessarily slow and it is not guaranteed to simplify the expression to the desired form. Therefore, we analyze instead the expression and identify common patterns to simplify it manually.

Therefore, we first factor the result, make it real, simplify it, and finally substitute the Bogoliubov coefficients \(u_{\alpha}\) and \(v_{\alpha}\).

# Define Bogoliubov substitutions
subs = (
    {u * v: Gamma / (2 * E) for u, v, Gamma, E in zip(us, vs, Gammas, Es)}
    | {u**2: (1 + xi / E) / 2 for u, xi, E in zip(us, xis, Es)}
    | {v**2: (1 - xi / E) / 2 for v, xi, E in zip(vs, xis, Es)}
)

def simplify_current(expr):
    """Simplification routine tailored to the perturbative calculation of current."""
    return sympy.re(expr.factor()).simplify().subs(subs)

This simplification produces a compact result.

%%time
current = simplify_current(current)

display_eq('I(n=0)', current)

\[\displaystyle I(n=0) = - \frac{2 \Gamma_{L} \Gamma_{R} t_{L}^{2} t_{R}^{2} \left(- E_{0} + E_{2} + 2 E_{L} + 2 E_{R}\right) \sin{\left(2 \phi \right)}}{E_{L} E_{R} \left(E_{0} - E_{2}\right) \left(E_{L} + E_{R}\right) \left(- E_{0} + E_{1} + E_{L}\right) \left(- E_{0} + E_{1} + E_{R}\right)}\]

CPU times: user 11.5 s, sys: 5.91 ms, total: 11.5 s
Wall time: 11.5 s

Applying the same procedure to the other two ground states, we compute the supercurrent for the \(N=1\) and \(N=2\) regimes.

%%time
currents = [current]
currents.extend(
    simplify_current(H_tilde[i, i, 2, 2, 1][0, 0]).subs({dphi: 1}).doit()
    for i in range(1, 3)
)
for i, current in enumerate(currents):
    display_eq(f"I(n={i})", current)

\[\displaystyle I(n=1) = - \frac{\Gamma_{L} \Gamma_{R} t_{L}^{2} t_{R}^{2} \left(E_{0}^{2} - 6 E_{0} E_{1} + 4 E_{0} E_{2} + 3 E_{0} E_{L} + 3 E_{0} E_{R} + 6 E_{1}^{2} - 6 E_{1} E_{2} - 6 E_{1} E_{L} - 6 E_{1} E_{R} + E_{2}^{2} + 3 E_{2} E_{L} + 3 E_{2} E_{R} + 2 E_{L}^{2} + 2 E_{L} E_{R} + 2 E_{R}^{2}\right) \sin{\left(2 \phi \right)}}{E_{L} E_{R} \left(E_{L} + E_{R}\right) \left(E_{0} - E_{1} + E_{L}\right) \left(E_{0} - E_{1} + E_{R}\right) \left(- E_{1} + E_{2} + E_{L}\right) \left(- E_{1} + E_{2} + E_{R}\right)}\]

\[\displaystyle I(n=2) = \frac{2 \Gamma_{L} \Gamma_{R} t_{L}^{2} t_{R}^{2} \left(E_{0} - E_{2} + 2 E_{L} + 2 E_{R}\right) \sin{\left(2 \phi \right)}}{E_{L} E_{R} \left(E_{0} - E_{2}\right) \left(E_{L} + E_{R}\right) \left(E_{1} - E_{2} + E_{L}\right) \left(E_{1} - E_{2} + E_{R}\right)}\]

CPU times: user 19.6 s, sys: 26 ms, total: 19.6 s
Wall time: 19.6 s

Visualize the results#

Finally, we plot the critical current, \(I_{c, n} = \lvert I_n(\phi=\pi/4) \rvert\), as a function of the number of electrons \(N\).

../_images/3784a5b7e61b8e9a0b4d72478f4274a54684892fb0fb5dc45fdcca82294d1b73.png