supermarq.qcvv.irb ================== .. py:module:: supermarq.qcvv.irb .. autoapi-nested-parse:: Tooling for interleaved randomised benchmarking Classes ------- .. autoapisummary:: supermarq.qcvv.irb.IRB supermarq.qcvv.irb.IRBResults supermarq.qcvv.irb.RBResults Module Contents --------------- .. py:class:: IRB(num_circuits: int, cycle_depths: collections.abc.Iterable[int], interleaved_gate: cirq.Gate | None = cirq.Z, num_qubits: int | None = 1, clifford_op_gateset: cirq.CompilationTargetGateset = cirq.CZTargetGateset(), *, random_seed: int | numpy.random.Generator | None = None) Bases: :py:obj:`supermarq.qcvv.base_experiment.QCVVExperiment`\ [\ :py:obj:`_RBResultsBase`\ ] Interleaved random benchmarking (IRB) experiment. IRB estimates the gate error of specified Clifford gate, :math:`\mathcal{C}^*`. This is achieved by first choosing a random sequence, :math:`\{\mathcal{C_i}\}_m` of :math:`m` Clifford gates and then using this to generate two circuits. The first is generated by appending to this sequence the single gate that corresponds to the inverse of the original sequence. The second circuit it obtained by inserting the interleaving gate, :math:`\mathcal{C}^*` after each gate in the sequence and then again appending the corresponding inverse element of the new circuit. Thus both circuits correspond to the identity operation. We run both circuits on the specified target and calculate the probability of measuring the resulting state in the ground state, :math:`p(0...0)`. This gives the circuit fidelity .. math:: f(m) = 2p(0...0) - 1 We can then fit an exponential decay :math:`\log(f) \sim m` to this circuit fidelity for each circuit, with decay rates :math:`\alpha` and :math:`\tilde{\alpha}` for the circuit without and with interleaving respectively. Finally the gate error of the specified gate, :math:`\mathcal{C}^*` is estimated as .. math:: e_{\mathcal{C}^*} = \frac{1}{2} \left(1 - \frac{\tilde{\alpha}}{\alpha}\right) For more details see: https://arxiv.org/abs/1203.4550 .. py:method:: gates_per_clifford(samples: int = 500) -> dict[str, float] Samples a number of random Clifford operations and calculates the average number of single and two qubit gates used to implement them. Note this depends on the gateset chosen for the experiment. :param samples: Number of samples to use. Defaults to 500. :returns: A dictionary with the average number of one and two qubit gates used. .. py:method:: random_clifford() -> cirq.CliffordGate Returns: A random clifford gate with the correct number of qubits for the current experiment. .. py:method:: random_single_qubit_clifford() -> cirq.SingleQubitCliffordGate Choose a random single qubit clifford gate. :returns: The random clifford gate. .. py:method:: random_two_qubit_clifford() -> cirq.CliffordGate Choose a random two qubit clifford gate. For algorithm details see https://arxiv.org/abs/1402.4848 & https://arxiv.org/abs/1210.7011. :returns: The random clifford gate. .. py:attribute:: clifford_op_gateset The gateset to use when implementing Clifford operations. .. py:class:: IRBResults Bases: :py:obj:`_RBResultsBase` Data structure for the IRB experiment results. .. py:method:: plot_results() -> None Plot the exponential decay of the circuit fidelity with cycle depth. :raises RuntimeError: If no data is stored. .. py:method:: print_results() -> None Prints the key results data. .. py:property:: average_interleaved_gate_error :type: float Returns: Estimate of the interleaving gate error. .. py:property:: average_interleaved_gate_error_std :type: float Returns: Standard deviation of the estimate for the interleaving gate error. .. py:property:: irb_decay_coefficient :type: float Returns: Decay coefficient estimate with the interleaving gate. .. py:property:: irb_decay_coefficient_std :type: float Returns: Standard deviation of the decay coefficient estimate with the interleaving gate. .. py:class:: RBResults Bases: :py:obj:`_RBResultsBase` Data structure for the RB experiment results. .. py:method:: plot_results() -> None Plot the exponential decay of the circuit fidelity with cycle depth. .. py:method:: print_results() -> None Prints the key results data. .. py:property:: average_error_per_clifford :type: float Returns: Estimate of the average error per Clifford operation. .. py:property:: average_error_per_clifford_std :type: float Returns: Standard deviation of the the average error per Clifford operation.