C贸digo fuente para qiskit.extensions.quantum_initializer.diagonal

# This code is part of Qiskit.
# (C) Copyright IBM 2020.
# This code is licensed under the Apache License, Version 2.0. You may
# obtain a copy of this license in the LICENSE.txt file in the root directory
# of this source tree or at http://www.apache.org/licenses/LICENSE-2.0.
# Any modifications or derivative works of this code must retain this
# copyright notice, and modified files need to carry a notice indicating
# that they have been altered from the originals.

# The structure of the code is based on Emanuel Malvetti's semester thesis at ETH in 2018,
# which was supervised by Raban Iten and Prof. Renato Renner.

# pylint: disable=missing-param-doc
# pylint: disable=missing-type-doc

Decomposes a diagonal matrix into elementary gates using the method described in Theorem 7 in
"Synthesis of Quantum Logic Circuits" by Shende et al. (https://arxiv.org/pdf/quant-ph/0406176.pdf).
import cmath
import math

import numpy as np

from qiskit.circuit import Gate
from qiskit.circuit.quantumcircuit import QuantumCircuit, QuantumRegister
from qiskit.exceptions import QiskitError

_EPS = 1e-10  # global variable used to chop very small numbers to zero

class DiagonalGate(Gate):
    diag =  list of the 2^k diagonal entries (for a diagonal gate on k qubits). Must contain at
    least two entries.

    def __init__(self, diag):
        """Check types"""
        # Check if diag has type "list"
        if not isinstance(diag, list):
            raise QiskitError("The diagonal entries are not provided in a list.")
        # Check if the right number of diagonal entries is provided and if the diagonal entries
        # have absolute value one.
        num_action_qubits = math.log2(len(diag))
        if num_action_qubits < 1 or not num_action_qubits.is_integer():
            raise QiskitError("The number of diagonal entries is not a positive power of 2.")
        for z in diag:
            except TypeError as ex:
                raise QiskitError(
                    "Not all of the diagonal entries can be converted to complex numbers."
                ) from ex
            if not np.abs(np.abs(z) - 1) < _EPS:
                raise QiskitError("A diagonal entry has not absolute value one.")
        # Create new gate.
        super().__init__("diagonal", int(num_action_qubits), diag)

    def _define(self):
        diag_circuit = self._dec_diag()
        gate = diag_circuit.to_instruction()
        q = QuantumRegister(self.num_qubits)
        diag_circuit = QuantumCircuit(q)
        diag_circuit.append(gate, q[:])
        self.definition = diag_circuit

    def validate_parameter(self, parameter):
        """Diagonal Gate parameter should accept complex
        (in addition to the Gate parameter types) and always return build-in complex."""
        if isinstance(parameter, complex):
            return complex(parameter)
            return complex(super().validate_parameter(parameter))

    def inverse(self):
        """Return the inverse of the diagonal gate."""
        return DiagonalGate([np.conj(entry) for entry in self.params])

    def _dec_diag(self):
        Call to create a circuit implementing the diagonal gate.
        q = QuantumRegister(self.num_qubits)
        circuit = QuantumCircuit(q)
        # Since the diagonal is a unitary, all its entries have absolute value one and the diagonal
        # is fully specified by the phases of its entries
        diag_phases = [cmath.phase(z) for z in self.params]
        n = len(self.params)
        while n >= 2:
            angles_rz = []
            for i in range(0, n, 2):
                diag_phases[i // 2], rz_angle = _extract_rz(diag_phases[i], diag_phases[i + 1])
            num_act_qubits = int(np.log2(n))
            contr_qubits = q[self.num_qubits - num_act_qubits + 1 : self.num_qubits]
            target_qubit = q[self.num_qubits - num_act_qubits]
            circuit.ucrz(angles_rz, contr_qubits, target_qubit)
            n //= 2
        circuit.global_phase += diag_phases[0]
        return circuit

# extract a Rz rotation (angle given by first output) such that exp(j*phase)*Rz(z_angle)
# is equal to the diagonal matrix with entires exp(1j*ph1) and exp(1j*ph2)
def _extract_rz(phi1, phi2):
    phase = (phi1 + phi2) / 2.0
    z_angle = phi2 - phi1
    return phase, z_angle

def diagonal(self, diag, qubit):
    """Attach a diagonal gate to a circuit.

    The decomposition is based on Theorem 7 given in "Synthesis of Quantum Logic Circuits" by
    Shende et al. (https://arxiv.org/pdf/quant-ph/0406176.pdf).

        diag (list): list of the 2^k diagonal entries (for a diagonal gate on k qubits).
            Must contain at least two entries
        qubit (QuantumRegister|list): list of k qubits the diagonal is
            acting on (the order of the qubits specifies the computational basis in which the
            diagonal gate is provided: the first element in diag acts on the state where all
            the qubits in q are in the state 0, the second entry acts on the state where all
            the qubits q[1],...,q[k-1] are in the state zero and q[0] is in the state 1,
            and so on)

        QuantumCircuit: the diagonal gate which was attached to the circuit.

        QiskitError: if the list of the diagonal entries or the qubit list is in bad format;
            if the number of diagonal entries is not 2^k, where k denotes the number of qubits

    if isinstance(qubit, QuantumRegister):
        qubit = qubit[:]
    # Check if q has type "list"
    if not isinstance(qubit, list):
        raise QiskitError(
            "The qubits must be provided as a list (also if there is only one qubit)."
    # Check if diag has type "list"
    if not isinstance(diag, list):
        raise QiskitError("The diagonal entries are not provided in a list.")
    num_action_qubits = math.log2(len(diag))
    if not len(qubit) == num_action_qubits:
        raise QiskitError(
            "The number of diagonal entries does not correspond to the number of qubits."
    return self.append(DiagonalGate(diag), qubit)

QuantumCircuit.diagonal = diagonal