PhaseEstimationScale
class PhaseEstimationScale(bound)
Bases: object
Set and use a bound on eigenvalues of a Hermitian operator in order to ensure phases are in the desired range and to convert measured phases into eigenvectors.
The bound
is set when constructing this class. Then the method scale
is used to find the factor by which to scale the operator.
If bound
is equal exactly to the largest eigenvalue, and the smallest eigenvalue is minus the largest, then these two eigenvalues will not be distinguished. For example, if the Hermitian operator is the Pauli Z operator with eigenvalues and , and bound
is , then both eigenvalues will be mapped to . This can be avoided by making bound
a bit larger.
Increasing bound
decreases the part of the interval that is used to map eigenvalues to phi
. However, sometimes this results in a better determination of the eigenvalues, because 1) although there are fewer discrete phases in the useful range, it may shift one of the discrete phases closer to the actual phase. And, 2) If one of the discrete phases is close to, or exactly equal to the actual phase, then artifacts (probability) in neighboring phases will be reduced. This is important because the artifacts may be larger than the probability in a phase representing another eigenvalue of interest whose corresponding eigenstate has a relatively small weight in the input state.
Parameters
bound (float
) – an upper bound on the absolute value of the eigenvalues of a Hermitian operator. (The operator is not needed here.)
Methods
from_pauli_sum
classmethod PhaseEstimationScale.from_pauli_sum(pauli_sum)
Create a PhaseEstimationScale from a SummedOp representing a sum of Pauli Operators.
It is assumed that the pauli_sum
is the sum of PauliOp
objects. The bound on the absolute value of the eigenvalues of the sum is obtained as the sum of the absolute values of the coefficients of the terms. This is the best bound available in the generic case. A PhaseEstimationScale
object is instantiated using this bound.
Parameters
pauli_sum (SummedOp |PauliSumOp |SparsePauliOp |Operator) – A SummedOp
whose terms are PauliOp
objects.
Raises
ValueError – if pauli_sum
is not a sum of Pauli operators.
Return type
PhaseEstimationScale’ | float
Returns
A PhaseEstimationScale
object
scale_phase
PhaseEstimationScale.scale_phase(phi, id_coefficient=0.0)
Convert a phase into an eigenvalue.
The input phase phi
corresponds to the eigenvalue of a unitary obtained by exponentiating a scaled Hermitian operator. Recall that the phase is obtained from phi
as . Furthermore, the Hermitian operator was scaled so that phi
is restricted to , corresponding to phases in . But the values of phi read from the phase-readout register are in . Any value of phi
greater than corresponds to a raw phase of minus the complement with respect to 1. After this possible shift, the phase is scaled by the inverse of the factor by which the Hermitian operator was scaled to recover the eigenvalue of the Hermitian operator.
Parameters
- phi (
float
) – Normalized phase in to be converted to an eigenvalue. - id_coefficient (
float
) – All eigenvalues are shifted by this value.
Return type
float
Returns
An eigenvalue computed from the input phase.
scale_phases
PhaseEstimationScale.scale_phases(phases, id_coefficient=0.0)
Convert a list or dict of phases to eigenvalues.
The values in the list, or keys in the dict, are values of phi` and are converted as described in the description of ``scale_phase
. In case phases
is a dict, the values of the dict are passed unchanged.
Parameters
- phases (list | dict) – a list or dict of values of
phi
. - id_coefficient (float) – All eigenvalues are shifted by this value.
Return type
dict | list
Returns
Eigenvalues computed from phases.
Attributes
scale
Return the Hamiltonian scaling factor.
Return the scale factor by which a Hermitian operator must be multiplied so that the phase of the corresponding unitary is restricted to . This factor is computed from the bound on the absolute values of the eigenvalues of the operator. The methods scale_phase
and scale_phases
are used recover the eigenvalues corresponding the original (unscaled) Hermitian operator.
Return type
float
Returns
The scale factor.