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Operator

Operator(data, input_dims=None, output_dims=None) GitHub(opens in a new tab)

Bases: qiskit.quantum_info.operators.linear_op.LinearOp

Matrix operator class

This represents a matrix operator MM that will evolve() a Statevector ψ|\psi\rangle by matrix-vector multiplication

ψMψ,|\psi\rangle \mapsto M|\psi\rangle,

and will evolve() a DensityMatrix ρ\rho by left and right multiplication

ρMρM.\rho \mapsto M \rho M^\dagger.

Initialize an operator object.

Parameters

  • **(**QuantumCircuit or (data) – Instruction or BaseOperator or matrix): data to initialize operator.
  • input_dims (tuple) – the input subsystem dimensions. [Default: None]
  • output_dims (tuple) – the output subsystem dimensions. [Default: None]

Raises

QiskitError – if input data cannot be initialized as an operator.

Additional Information:

If the input or output dimensions are None, they will be automatically determined from the input data. If the input data is a Numpy array of shape (2**N, 2**N) qubit systems will be used. If the input operator is not an N-qubit operator, it will assign a single subsystem with dimension specified by the shape of the input.


Methods

adjoint

Operator.adjoint()

Return the adjoint of the Operator.

compose

Operator.compose(other, qargs=None, front=False)

Return the operator composition with another Operator.

Parameters

  • other (Operator) – a Operator object.
  • qargs (list or None) – Optional, a list of subsystem positions to apply other on. If None apply on all subsystems (default: None).
  • front (bool) – If True compose using right operator multiplication, instead of left multiplication [default: False].

Returns

The composed Operator.

Return type

Operator

Raises

QiskitError – if other cannot be converted to an operator, or has incompatible dimensions for specified subsystems.

Note

Composition (&) by default is defined as left matrix multiplication for matrix operators, while dot() is defined as right matrix multiplication. That is that A & B == A.compose(B) is equivalent to B.dot(A) when A and B are of the same type.

Setting the front=True kwarg changes this to right matrix multiplication and is equivalent to the dot() method A.dot(B) == A.compose(B, front=True).

conjugate

Operator.conjugate()

Return the conjugate of the Operator.

copy

Operator.copy()

Make a deep copy of current operator.

dot

Operator.dot(other, qargs=None)

Return the right multiplied operator self * other.

Parameters

  • other (Operator) – an operator object.
  • qargs (list or None) – Optional, a list of subsystem positions to apply other on. If None apply on all subsystems (default: None).

Returns

The right matrix multiplied Operator.

Return type

Operator

equiv

Operator.equiv(other, rtol=None, atol=None)

Return True if operators are equivalent up to global phase.

Parameters

  • other (Operator) – an operator object.
  • rtol (float) – relative tolerance value for comparison.
  • atol (float) – absolute tolerance value for comparison.

Returns

True if operators are equivalent up to global phase.

Return type

bool

expand

Operator.expand(other)

Return the reverse-order tensor product with another Operator.

Parameters

other (Operator) – a Operator object.

Returns

the tensor product bab \otimes a, where aa

is the current Operator, and bb is the other Operator.

Return type

Operator

from_label

classmethod Operator.from_label(label)

Return a tensor product of single-qubit operators.

Parameters

label (string) – single-qubit operator string.

Returns

The N-qubit operator.

Return type

Operator

Raises

QiskitError – if the label contains invalid characters, or the length of the label is larger than an explicitly specified num_qubits.

Additional Information:

The labels correspond to the single-qubit matrices: ‘I’: [[1, 0], [0, 1]] ‘X’: [[0, 1], [1, 0]] ‘Y’: [[0, -1j], [1j, 0]] ‘Z’: [[1, 0], [0, -1]] ‘H’: [[1, 1], [1, -1]] / sqrt(2) ‘S’: [[1, 0], [0 , 1j]] ‘T’: [[1, 0], [0, (1+1j) / sqrt(2)]] ‘0’: [[1, 0], [0, 0]] ‘1’: [[0, 0], [0, 1]] ‘+’: [[0.5, 0.5], [0.5 , 0.5]] ‘-‘: [[0.5, -0.5], [-0.5 , 0.5]] ‘r’: [[0.5, -0.5j], [0.5j , 0.5]] ‘l’: [[0.5, 0.5j], [-0.5j , 0.5]]

input_dims

Operator.input_dims(qargs=None)

Return tuple of input dimension for specified subsystems.

is_unitary

Operator.is_unitary(atol=None, rtol=None)

Return True if operator is a unitary matrix.

output_dims

Operator.output_dims(qargs=None)

Return tuple of output dimension for specified subsystems.

power

Operator.power(n)

Return the matrix power of the operator.

Parameters

n (float) – the power to raise the matrix to.

Returns

the resulting operator O ** n.

Return type

Operator

Raises

QiskitError – if the input and output dimensions of the operator are not equal.

reshape

Operator.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) – new subsystem input dimensions. If None the original input dims will be preserved [Default: None].
  • output_dims (None or tuple) – new subsystem output dimensions. If None the original output dims will be preserved [Default: None].
  • num_qubits (None or int) – 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.

reverse_qargs

Operator.reverse_qargs()

Return an Operator with reversed subsystem ordering.

For a tensor product operator this is equivalent to reversing the order of tensor product subsystems. For an operator A=An1...A0A = A_{n-1} \otimes ... \otimes A_0 the returned operator will be A0...An1A_0 \otimes ... \otimes A_{n-1}.

Returns

the operator with reversed subsystem order.

Return type

Operator

tensor

Operator.tensor(other)

Return the tensor product with another Operator.

Parameters

other (Operator) – a Operator object.

Returns

the tensor product aba \otimes b, where aa

is the current Operator, and bb is the other Operator.

Return type

Operator

Note

The tensor product can be obtained using the ^ binary operator. Hence a.tensor(b) is equivalent to a ^ b.

to_instruction

Operator.to_instruction()

Convert to a UnitaryGate instruction.

to_operator

Operator.to_operator()

Convert operator to matrix operator class

transpose

Operator.transpose()

Return the transpose of the Operator.


Attributes

atol

= 1e-08

data

Return data.

dim

Return tuple (input_shape, output_shape).

num_qubits

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

qargs

Return the qargs for the operator.

rtol

= 1e-05

settings

Return operator settings.

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