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PauliList

qiskit.quantum_info.PauliList(data) GitHub(opens in a new tab)

Bases: BasePauli, LinearMixin, GroupMixin

List of N-qubit Pauli operators.

This class is an efficient representation of a list of Pauli operators. It supports 1D numpy array indexing returning a Pauli for integer indexes or a PauliList for slice or list indices.

Initialization

A PauliList object can be initialized in several ways.

PauliList(list[str])

where strings are same representation with Pauli.

PauliList(Pauli) and PauliList(list[Pauli])

where Pauli is Pauli.

PauliList.from_symplectic(z, x, phase)

where z and x are 2 dimensional boolean numpy.ndarrays and phase is an integer in [0, 1, 2, 3].

For example,

import numpy as np
 
from qiskit.quantum_info import Pauli, PauliList
 
# 1. init from list[str]
pauli_list = PauliList(["II", "+ZI", "-iYY"])
print("1. ", pauli_list)
 
pauli1 = Pauli("iXI")
pauli2 = Pauli("iZZ")
 
# 2. init from Pauli
print("2. ", PauliList(pauli1))
 
# 3. init from list[Pauli]
print("3. ", PauliList([pauli1, pauli2]))
 
# 4. init from np.ndarray
z = np.array([[True, True], [False, False]])
x = np.array([[False, True], [True, False]])
phase = np.array([0, 1])
pauli_list = PauliList.from_symplectic(z, x, phase)
print("4. ", pauli_list)
1.  ['II', 'ZI', '-iYY']
2.  ['iXI']
3.  ['iXI', 'iZZ']
4.  ['YZ', '-iIX']

Data Access

The individual Paulis can be accessed and updated using the [] operator which accepts integer, lists, or slices for selecting subsets of PauliList. If integer is given, it returns Pauli not PauliList.

pauli_list = PauliList(["XX", "ZZ", "IZ"])
print("Integer: ", repr(pauli_list[1]))
print("List: ", repr(pauli_list[[0, 2]]))
print("Slice: ", repr(pauli_list[0:2]))
Integer:  Pauli('ZZ')
List:  PauliList(['XX', 'IZ'])
Slice:  PauliList(['XX', 'ZZ'])

Iteration

Rows in the Pauli table can be iterated over like a list. Iteration can also be done using the label or matrix representation of each row using the label_iter() and matrix_iter() methods.

Initialize the PauliList.

Parameters

data (Pauli orlist(opens in a new tab)) – input data for Paulis. If input is a list each item in the list must be a Pauli object or Pauli str.

Raises

QiskitError – if input array is invalid shape.

Additional Information:

The input array is not copied so multiple Pauli tables can share the same underlying array.


Attributes

dim

Return tuple (input_shape, output_shape).

num_qubits

Return the number of qubits if a N-qubit operator or None otherwise.

phase

Return the phase exponent of the PauliList.

qargs

Return the qargs for the operator.

settings

Return settings.

shape

The full shape of the array()

size

The number of Pauli rows in the table.

x

The x array for the symplectic representation.

z

The z array for the symplectic representation.


Methods

adjoint

adjoint()

Return the adjoint of each Pauli in the list.

anticommutes

anticommutes(other, qargs=None)

Return True if other Pauli that anticommutes with other.

Parameters

Returns

True if Paulis anticommute, False if they commute.

Return type

bool(opens in a new tab)

anticommutes_with_all

anticommutes_with_all(other)

Return indexes of rows that commute other.

If other is a multi-row Pauli list the returned vector indexes rows of the current PauliList that anti-commute with all Paulis in other. If no rows satisfy the condition the returned array will be empty.

Parameters

other (PauliList) – a single Pauli or multi-row PauliList.

Returns

index array of the anti-commuting rows.

Return type

array

argsort

argsort(weight=False, phase=False)

Return indices for sorting the rows of the table.

The default sort method is lexicographic sorting by qubit number. By using the weight kwarg the output can additionally be sorted by the number of non-identity terms in the Pauli, where the set of all Paulis of a given weight are still ordered lexicographically.

Parameters

Returns

the indices for sorting the table.

Return type

array

commutes

commutes(other, qargs=None)

Return True for each Pauli that commutes with other.

Parameters

Returns

True if Paulis commute, False if they anti-commute.

Return type

bool(opens in a new tab)

commutes_with_all

commutes_with_all(other)

Return indexes of rows that commute other.

If other is a multi-row Pauli list the returned vector indexes rows of the current PauliList that commute with all Paulis in other. If no rows satisfy the condition the returned array will be empty.

Parameters

other (PauliList) – a single Pauli or multi-row PauliList.

Returns

index array of the commuting rows.

Return type

array

compose

compose(other, qargs=None, front=False, inplace=False)

Return the composition self∘other for each Pauli in the list.

Parameters

Returns

the list of composed Paulis.

Return type

PauliList

Raises

QiskitError – if other cannot be converted to a PauliList, does not have either 1 or the same number of Paulis as the current list, or has the wrong number of qubits for the specified qargs.

conjugate

conjugate()

Return the conjugate of each Pauli in the list.

copy

copy()

Make a deep copy of current operator.

delete

delete(ind, qubit=False)

Return a copy with Pauli rows deleted from table.

When deleting qubits the qubit index is the same as the column index of the underlying X and Z arrays.

Parameters

Returns

the resulting table with the entries removed.

Return type

PauliList

Raises

QiskitError – if ind is out of bounds for the array size or number of qubits.

dot

dot(other, qargs=None, inplace=False)

Return the composition other∘self for each Pauli in the list.

Parameters

Returns

the list of composed Paulis.

Return type

PauliList

Raises

QiskitError – if other cannot be converted to a PauliList, does not have either 1 or the same number of Paulis as the current list, or has the wrong number of qubits for the specified qargs.

equiv

equiv(other)

Entrywise comparison of Pauli equivalence up to global phase.

Parameters

other (PauliList orPauli) – a comparison object.

Returns

An array of True or False for entrywise equivalence

of the current table.

Return type

np.ndarray

evolve

evolve(other, qargs=None, frame='h')

Performs either Heisenberg (default) or Schrödinger picture evolution of the Pauli by a Clifford and returns the evolved Pauli.

Schrödinger picture evolution can be chosen by passing parameter frame='s'. This option yields a faster calculation.

Heisenberg picture evolves the Pauli as P=C.P.CP^\prime = C^\dagger.P.C.

Schrödinger picture evolves the Pauli as P=C.P.CP^\prime = C.P.C^\dagger.

Parameters

Returns

the Pauli C.P.CC^\dagger.P.C (Heisenberg picture) or the Pauli C.P.CC.P.C^\dagger (Schrödinger picture).

Return type

PauliList

Raises

QiskitError – if the Clifford number of qubits and qargs don’t match.

expand

expand(other)

Return the expand product of each Pauli in the list.

Parameters

other (PauliList) – another PauliList.

Returns

the list of tensor product Paulis.

Return type

PauliList

Raises

QiskitError – if other cannot be converted to a PauliList, does not have either 1 or the same number of Paulis as the current list.

from_symplectic

classmethod from_symplectic(z, x, phase=0)

Construct a PauliList from a symplectic data.

Parameters

  • z (np.ndarray) – 2D boolean Numpy array.
  • x (np.ndarray) – 2D boolean Numpy array.
  • phase (np.ndarray or None) – Optional, 1D integer array from Z_4.

Returns

the constructed PauliList.

Return type

PauliList

group_commuting

group_commuting(qubit_wise=False)

Partition a PauliList into sets of commuting Pauli strings.

Parameters

qubit_wise (bool(opens in a new tab)) –

whether the commutation rule is applied to the whole operator, or on a per-qubit basis. For example:

>>> from qiskit.quantum_info import PauliList
>>> op = PauliList(["XX", "YY", "IZ", "ZZ"])
>>> op.group_commuting()
[PauliList(['XX', 'YY']), PauliList(['IZ', 'ZZ'])]
>>> op.group_commuting(qubit_wise=True)
[PauliList(['XX']), PauliList(['YY']), PauliList(['IZ', 'ZZ'])]

Returns

List of PauliLists where each PauliList contains commuting Pauli operators.

Return type

list(opens in a new tab)[PauliList]

group_qubit_wise_commuting

group_qubit_wise_commuting()

Partition a PauliList into sets of mutually qubit-wise commuting Pauli strings.

Returns

List of PauliLists where each PauliList contains commutable Pauli operators.

Return type

list(opens in a new tab)[PauliList]

input_dims

input_dims(qargs=None)

Return tuple of input dimension for specified subsystems.

insert

insert(ind, value, qubit=False)

Insert Paulis into the table.

When inserting qubits the qubit index is the same as the column index of the underlying X and Z arrays.

Parameters

Returns

the resulting table with the entries inserted.

Return type

PauliList

Raises

QiskitError – if the insertion index is invalid.

inverse

inverse()

Return the inverse of each Pauli in the list.

label_iter

label_iter()

Return a label representation iterator.

This is a lazy iterator that converts each row into the string label only as it is used. To convert the entire table to labels use the to_labels() method.

Returns

label iterator object for the PauliList.

Return type

LabelIterator

matrix_iter

matrix_iter(sparse=False)

Return a matrix representation iterator.

This is a lazy iterator that converts each row into the Pauli matrix representation only as it is used. To convert the entire table to matrices use the to_matrix() method.

Parameters

sparse (bool(opens in a new tab)) – optionally return sparse CSR matrices if True, otherwise return Numpy array matrices (Default: False)

Returns

matrix iterator object for the PauliList.

Return type

MatrixIterator

output_dims

output_dims(qargs=None)

Return tuple of output dimension for specified subsystems.

power

power(n)

Return the compose of a operator with itself n times.

Parameters

n (int(opens in a new tab)) – the number of times to compose with self (n>0).

Returns

the n-times composed operator.

Return type

Clifford

Raises

QiskitError – if the input and output dimensions of the operator are not equal, or the power is not a positive integer.

reshape

reshape(input_dims=None, output_dims=None, num_qubits=None)

Return a shallow copy with reshaped input and output subsystem dimensions.

Parameters

  • input_dims (None or tuple(opens in a new tab)) – new subsystem input dimensions. If None the original input dims will be preserved [Default: None].
  • output_dims (None or tuple(opens in a new tab)) – new subsystem output dimensions. If None the original output dims will be preserved [Default: None].
  • num_qubits (None or int(opens in a new tab)) – reshape to an N-qubit operator [Default: None].

Returns

returns self with reshaped input and output dimensions.

Return type

BaseOperator

Raises

QiskitError – if combined size of all subsystem input dimension or subsystem output dimensions is not constant.

sort

sort(weight=False, phase=False)

Sort the rows of the table.

The default sort method is lexicographic sorting by qubit number. By using the weight kwarg the output can additionally be sorted by the number of non-identity terms in the Pauli, where the set of all Paulis of a given weight are still ordered lexicographically.

Example

Consider sorting all a random ordering of all 2-qubit Paulis

from numpy.random import shuffle
from qiskit.quantum_info.operators import PauliList
 
# 2-qubit labels
labels = ['II', 'IX', 'IY', 'IZ', 'XI', 'XX', 'XY', 'XZ',
          'YI', 'YX', 'YY', 'YZ', 'ZI', 'ZX', 'ZY', 'ZZ']
# Shuffle Labels
shuffle(labels)
pt = PauliList(labels)
print('Initial Ordering')
print(pt)
 
# Lexicographic Ordering
srt = pt.sort()
print('Lexicographically sorted')
print(srt)
 
# Weight Ordering
srt = pt.sort(weight=True)
print('Weight sorted')
print(srt)
Initial Ordering
['YX', 'ZZ', 'XZ', 'YI', 'YZ', 'II', 'XX', 'XI', 'XY', 'YY', 'IX', 'IZ',
 'ZY', 'ZI', 'ZX', 'IY']
Lexicographically sorted
['II', 'IX', 'IY', 'IZ', 'XI', 'XX', 'XY', 'XZ', 'YI', 'YX', 'YY', 'YZ',
 'ZI', 'ZX', 'ZY', 'ZZ']
Weight sorted
['II', 'IX', 'IY', 'IZ', 'XI', 'YI', 'ZI', 'XX', 'XY', 'XZ', 'YX', 'YY',
 'YZ', 'ZX', 'ZY', 'ZZ']

Parameters

Returns

a sorted copy of the original table.

Return type

PauliList

tensor

tensor(other)

Return the tensor product with each Pauli in the list.

Parameters

other (PauliList) – another PauliList.

Returns

the list of tensor product Paulis.

Return type

PauliList

Raises

QiskitError – if other cannot be converted to a PauliList, does not have either 1 or the same number of Paulis as the current list.

to_labels

to_labels(array=False)

Convert a PauliList to a list Pauli string labels.

For large PauliLists converting using the array=True kwarg will be more efficient since it allocates memory for the full Numpy array of labels in advance.

LabelSymplecticMatrix
"I"[0,0][0, 0][1001]\begin{bmatrix} 1 & 0 \\ 0 & 1 \end{bmatrix}
"X"[1,0][1, 0][0110]\begin{bmatrix} 0 & 1 \\ 1 & 0 \end{bmatrix}
"Y"[1,1][1, 1][0ii0]\begin{bmatrix} 0 & -i \\ i & 0 \end{bmatrix}
"Z"[0,1][0, 1][1001]\begin{bmatrix} 1 & 0 \\ 0 & -1 \end{bmatrix}

Parameters

array (bool(opens in a new tab)) – return a Numpy array if True, otherwise return a list (Default: False).

Returns

The rows of the PauliList in label form.

Return type

list(opens in a new tab) or array

to_matrix

to_matrix(sparse=False, array=False)

Convert to a list or array of Pauli matrices.

For large PauliLists converting using the array=True kwarg will be more efficient since it allocates memory a full rank-3 Numpy array of matrices in advance.

LabelSymplecticMatrix
"I"[0,0][0, 0][1001]\begin{bmatrix} 1 & 0 \\ 0 & 1 \end{bmatrix}
"X"[1,0][1, 0][0110]\begin{bmatrix} 0 & 1 \\ 1 & 0 \end{bmatrix}
"Y"[1,1][1, 1][0ii0]\begin{bmatrix} 0 & -i \\ i & 0 \end{bmatrix}
"Z"[0,1][0, 1][1001]\begin{bmatrix} 1 & 0 \\ 0 & -1 \end{bmatrix}

Parameters

  • sparse (bool(opens in a new tab)) – if True return sparse CSR matrices, otherwise return dense Numpy arrays (Default: False).
  • array (bool(opens in a new tab)) – return as rank-3 numpy array if True, otherwise return a list of Numpy arrays (Default: False).

Returns

A list of dense Pauli matrices if array=False` and ``sparse=False`. list: A list of sparse Pauli matrices if ``array=False and sparse=True. array: A dense rank-3 array of Pauli matrices if array=True.

Return type

list(opens in a new tab)

transpose

transpose()

Return the transpose of each Pauli in the list.

unique

unique(return_index=False, return_counts=False)

Return unique Paulis from the table.

Example

from qiskit.quantum_info.operators import PauliList
 
pt = PauliList(['X', 'Y', '-X', 'I', 'I', 'Z', 'X', 'iZ'])
unique = pt.unique()
print(unique)
['X', 'Y', '-X', 'I', 'Z', 'iZ']

Parameters

  • return_index (bool(opens in a new tab)) – If True, also return the indices that result in the unique array. (Default: False)
  • return_counts (bool(opens in a new tab)) – If True, also return the number of times each unique item appears in the table.

Returns

unique

the table of the unique rows.

unique_indices: np.ndarray, optional

The indices of the first occurrences of the unique values in the original array. Only provided if return_index is True.

unique_counts: np.array, optional

The number of times each of the unique values comes up in the original array. Only provided if return_counts is True.

Return type

PauliList

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