# This code is part of Qiskit. # # (C) Copyright IBM 2020, 2023. # # 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. """PauliSumOp Class""" from collections import defaultdict from typing import Dict, List, Optional, Set, Tuple, Union, cast import numpy as np from scipy.sparse import spmatrix from qiskit.circuit import Instruction, ParameterExpression from qiskit.opflow.exceptions import OpflowError from qiskit.opflow.list_ops.summed_op import SummedOp from qiskit.opflow.list_ops.tensored_op import TensoredOp from qiskit.opflow.operator_base import OperatorBase from qiskit.opflow.primitive_ops.pauli_op import PauliOp from qiskit.opflow.primitive_ops.primitive_op import PrimitiveOp from qiskit.quantum_info import Pauli, SparsePauliOp, Statevector from qiskit.quantum_info.operators.custom_iterator import CustomIterator from qiskit.utils.deprecation import deprecate_func class PauliSumOp(PrimitiveOp): """Deprecated: Class for Operators backed by Terra's ``SparsePauliOp`` class.""" primitive: SparsePauliOp @deprecate_func( since="0.24.0", additional_msg="For code migration guidelines, visit https://qisk.it/opflow_migration.", ) def __init__( self, primitive: SparsePauliOp, coeff: Union[complex, ParameterExpression] = 1.0, grouping_type: str = "None", ) -> None: """ Args: primitive: The SparsePauliOp which defines the behavior of the underlying function. coeff: A coefficient multiplying the primitive. grouping_type: The type of grouping. If None, the operator is not grouped. Raises: TypeError: invalid parameters. """ if not isinstance(primitive, SparsePauliOp): raise TypeError( f"PauliSumOp can only be instantiated with SparsePauliOp, not {type(primitive)}" ) super().__init__(primitive, coeff=coeff) self._grouping_type = grouping_type def primitive_strings(self) -> Set[str]: return {"SparsePauliOp"} @property def grouping_type(self) -> str: """ Returns: Type of Grouping """ return self._grouping_type @property def num_qubits(self) -> int: return self.primitive.num_qubits @property def coeffs(self): """Return the Pauli coefficients.""" return self.coeff * self.primitive.coeffs @property def settings(self) -> Dict: """Return operator settings.""" data = super().settings data.update({"grouping_type": self._grouping_type}) return data def matrix_iter(self, sparse=False): """Return a matrix representation iterator. This is a lazy iterator that converts each term in the PauliSumOp into a matrix as it is used. To convert to a single matrix use the :meth:`to_matrix` method. Args: sparse (bool): optionally return sparse CSR matrices if True, otherwise return Numpy array matrices (Default: False) Returns: MatrixIterator: matrix iterator object for the PauliSumOp. """ class MatrixIterator(CustomIterator): """Matrix representation iteration and item access.""" def __repr__(self): return f"" def __getitem__(self, key): sumopcoeff = self.obj.coeff * self.obj.primitive.coeffs[key] return sumopcoeff * self.obj.primitive.paulis[key].to_matrix(sparse=sparse) return MatrixIterator(self) def add(self, other: OperatorBase) -> OperatorBase: if not self.num_qubits == other.num_qubits: raise ValueError( f"Sum of operators with different numbers of qubits, {self.num_qubits} and " f"{other.num_qubits}, is not well defined" ) if ( isinstance(other, PauliSumOp) and not isinstance(self.coeff, ParameterExpression) and not isinstance(other.coeff, ParameterExpression) ): return PauliSumOp(self.coeff * self.primitive + other.coeff * other.primitive, coeff=1) if ( isinstance(other, PauliOp) and not isinstance(self.coeff, ParameterExpression) and not isinstance(other.coeff, ParameterExpression) ): return PauliSumOp( self.coeff * self.primitive + other.coeff * SparsePauliOp(other.primitive) ) return SummedOp([self, other]) def mul(self, scalar: Union[complex, ParameterExpression]) -> OperatorBase: if isinstance(scalar, (int, float, complex)) and scalar != 0: return PauliSumOp(scalar * self.primitive, coeff=self.coeff) return PauliSumOp(self.primitive, coeff=self.coeff * scalar) def adjoint(self) -> "PauliSumOp": return PauliSumOp(self.primitive.adjoint(), coeff=self.coeff.conjugate()) def equals(self, other: OperatorBase) -> bool: self_reduced, other_reduced = self.reduce(), other.reduce() if isinstance(other_reduced, PauliOp): other_reduced = PauliSumOp( SparsePauliOp(other_reduced.primitive, coeffs=[other_reduced.coeff]) ) if not isinstance(other_reduced, PauliSumOp): return False if isinstance(self_reduced.coeff, ParameterExpression) or isinstance( other_reduced.coeff, ParameterExpression ): return self_reduced.coeff == other_reduced.coeff and self_reduced.primitive.equiv( other_reduced.primitive ) return len(self_reduced) == len(other_reduced) and self_reduced.primitive.equiv( other_reduced.primitive ) def _expand_dim(self, num_qubits: int) -> "PauliSumOp": return PauliSumOp( self.primitive.tensor(SparsePauliOp(Pauli("I" * num_qubits))), coeff=self.coeff, ) def tensor(self, other: OperatorBase) -> Union["PauliSumOp", TensoredOp]: if isinstance(other, PauliSumOp): return PauliSumOp( self.primitive.tensor(other.primitive), coeff=self.coeff * other.coeff, ) if isinstance(other, PauliOp): return PauliSumOp( self.primitive.tensor(other.primitive), coeff=self.coeff * other.coeff, ) return TensoredOp([self, other]) def permute(self, permutation: List[int]) -> "PauliSumOp": """Permutes the sequence of ``PauliSumOp``. Args: permutation: A list defining where each Pauli should be permuted. The Pauli at index j of the primitive should be permuted to position permutation[j]. Returns: A new PauliSumOp representing the permuted operator. For operator (X ^ Y ^ Z) and indices=[1,2,4], it returns (X ^ I ^ Y ^ Z ^ I). Raises: OpflowError: if indices do not define a new index for each qubit. """ set_perm = set(permutation) if len(set_perm) != len(permutation) or any(index < 0 for index in set_perm): raise OpflowError(f"List {permutation} is not a permutation.") if len(permutation) != self.num_qubits: raise OpflowError( "List of indices to permute must have the same size as Pauli Operator" ) length = max(permutation) + 1 if length > self.num_qubits: spop = self.primitive.tensor(SparsePauliOp(Pauli("I" * (length - self.num_qubits)))) else: spop = self.primitive.copy() permutation = [i for i in range(length) if i not in permutation] + permutation permu_arr = np.arange(length)[np.argsort(permutation)] spop.paulis.x = spop.paulis.x[:, permu_arr] spop.paulis.z = spop.paulis.z[:, permu_arr] return PauliSumOp(spop, self.coeff) def compose( self, other: OperatorBase, permutation: Optional[List[int]] = None, front: bool = False, ) -> OperatorBase: new_self, other = self._expand_shorter_operator_and_permute(other, permutation) new_self = cast(PauliSumOp, new_self) if front: return other.compose(new_self) # If self is identity, just return other. if not np.any(np.logical_or(new_self.primitive.paulis.x, new_self.primitive.paulis.z)): return other * new_self.coeff * sum(new_self.primitive.coeffs) # Both PauliSumOps if isinstance(other, PauliSumOp): return PauliSumOp( new_self.primitive.dot(other.primitive), coeff=new_self.coeff * other.coeff, ) if isinstance(other, PauliOp): other_primitive = SparsePauliOp(other.primitive) return PauliSumOp( new_self.primitive.dot(other_primitive), coeff=new_self.coeff * other.coeff, ) # pylint: disable=cyclic-import from ..state_fns.circuit_state_fn import CircuitStateFn from .circuit_op import CircuitOp if isinstance(other, (CircuitOp, CircuitStateFn)): pauli_op = cast(Union[PauliOp, SummedOp], new_self.to_pauli_op()) return pauli_op.to_circuit_op().compose(other) return super(PauliSumOp, new_self).compose(other) def to_matrix(self, massive: bool = False) -> np.ndarray: OperatorBase._check_massive("to_matrix", True, self.num_qubits, massive) if isinstance(self.coeff, ParameterExpression): return (self.primitive.to_matrix(sparse=True)).toarray() * self.coeff return (self.primitive.to_matrix(sparse=True) * self.coeff).toarray() def __str__(self) -> str: def format_sign(x): return x.real if np.isreal(x) else x def format_number(x): x = format_sign(x) if isinstance(x, (int, float)) and x < 0: return f"- {-x}" return f"+ {x}" indent = "" if self.coeff == 1 else " " prim_list = self.primitive.to_list() if prim_list: first = prim_list[0] if isinstance(first[1], (int, float)) and first[1] < 0: main_string = indent + f"- {-first[1].real} * {first[0]}" else: main_string = indent + f"{format_sign(first[1])} * {first[0]}" main_string += "".join([f"\n{indent}{format_number(c)} * {p}" for p, c in prim_list[1:]]) return f"{main_string}" if self.coeff == 1 else f"{self.coeff} * (\n{main_string}\n)" def eval( self, front: Optional[ Union[str, Dict[str, complex], np.ndarray, OperatorBase, Statevector] ] = None, ) -> Union[OperatorBase, complex]: if front is None: return self.to_matrix_op() # pylint: disable=cyclic-import from ..list_ops.list_op import ListOp from ..state_fns.circuit_state_fn import CircuitStateFn from ..state_fns.dict_state_fn import DictStateFn from ..state_fns.state_fn import StateFn from .circuit_op import CircuitOp # For now, always do this. If it's not performant, we can be more granular. if not isinstance(front, OperatorBase): front = StateFn(front, is_measurement=False) if isinstance(front, ListOp) and front.distributive: return front.combo_fn( [self.eval(front.coeff * front_elem) for front_elem in front.oplist] ) else: if self.num_qubits != front.num_qubits: raise ValueError( "eval does not support operands with differing numbers of qubits, " "{} and {}, respectively.".format(self.num_qubits, front.num_qubits) ) if isinstance(front, DictStateFn): new_dict: Dict[str, int] = defaultdict(int) corrected_x_bits = self.primitive.paulis.x[:, ::-1] corrected_z_bits = self.primitive.paulis.z[:, ::-1] coeffs = self.primitive.coeffs for bstr, v in front.primitive.items(): bitstr = np.fromiter(bstr, dtype=int).astype(bool) new_b_str = np.logical_xor(bitstr, corrected_x_bits) new_str = ["".join([str(b) for b in bs]) for bs in new_b_str.astype(int)] z_factor = np.prod(1 - 2 * np.logical_and(bitstr, corrected_z_bits), axis=1) y_factor = np.prod( np.sqrt(1 - 2 * np.logical_and(corrected_x_bits, corrected_z_bits) + 0j), axis=1, ) for i, n_str in enumerate(new_str): new_dict[n_str] += v * z_factor[i] * y_factor[i] * coeffs[i] return DictStateFn(new_dict, coeff=self.coeff * front.coeff) elif isinstance(front, StateFn) and front.is_measurement: raise ValueError("Operator composed with a measurement is undefined.") # Composable types with PauliOp elif isinstance(front, (PauliSumOp, PauliOp, CircuitOp, CircuitStateFn)): return self.compose(front).eval() # Covers VectorStateFn and OperatorStateFn front = cast(StateFn, front) return self.to_matrix_op().eval(front.to_matrix_op()) def exp_i(self) -> OperatorBase: """Return a ``CircuitOp`` equivalent to e^-iH for this operator H.""" # TODO: optimize for some special cases from ..evolutions.evolved_op import EvolvedOp return EvolvedOp(self) def to_instruction(self) -> Instruction: return self.to_matrix_op().to_circuit().to_instruction() # type: ignore def to_pauli_op(self, massive: bool = False) -> Union[PauliOp, SummedOp]: def to_native(x): return x.item() if isinstance(x, np.generic) else x if len(self.primitive) == 1: return PauliOp( Pauli((self.primitive.paulis.z[0], self.primitive.paulis.x[0])), to_native(np.real_if_close(self.primitive.coeffs[0])) * self.coeff, ) coeffs = np.real_if_close(self.primitive.coeffs) return SummedOp( [ PauliOp(pauli, to_native(coeff)) for pauli, coeff in zip(self.primitive.paulis, coeffs) ], coeff=self.coeff, ) def __getitem__(self, offset: Union[int, slice]) -> "PauliSumOp": """Allows array-indexing style access to the ``PauliSumOp``. Args: offset: The index of ``PauliSumOp``. Returns: The ``PauliSumOp`` at index ``offset``, """ return PauliSumOp(self.primitive[offset], self.coeff) def __iter__(self): for i in range(len(self)): yield self[i] def __len__(self) -> int: """Length of ``SparsePauliOp``. Returns: An int equal to the length of SparsePauliOp. """ return len(self.primitive) def reduce(self, atol: Optional[float] = None, rtol: Optional[float] = None) -> "PauliSumOp": """Simplify the primitive ``SparsePauliOp``. Args: atol: Absolute tolerance for checking if coefficients are zero (Default: 1e-8). rtol: Relative tolerance for checking if coefficients are zero (Default: 1e-5). Returns: The simplified ``PauliSumOp``. """ if isinstance(self.coeff, (int, float, complex)): primitive = self.coeff * self.primitive return PauliSumOp(primitive.simplify(atol=atol, rtol=rtol)) return PauliSumOp(self.primitive.simplify(atol=atol, rtol=rtol), self.coeff) def to_spmatrix(self) -> spmatrix: """Returns SciPy sparse matrix representation of the ``PauliSumOp``. Returns: CSR sparse matrix representation of the ``PauliSumOp``. Raises: ValueError: invalid parameters. """ return self.primitive.to_matrix(sparse=True) * self.coeff @classmethod def from_list( cls, pauli_list: List[Tuple[str, Union[complex, ParameterExpression]]], coeff: Union[complex, ParameterExpression] = 1.0, dtype: type = complex, ) -> "PauliSumOp": """Construct from a pauli_list with the form [(pauli_str, coeffs)] Args: pauli_list: A list of Tuple of pauli_str and coefficient. coeff: A coefficient multiplying the primitive. dtype: The dtype to use to construct the internal SparsePauliOp. Defaults to ``complex``. Returns: The PauliSumOp constructed from the pauli_list. """ return cls(SparsePauliOp.from_list(pauli_list, dtype=dtype), coeff=coeff) def is_zero(self) -> bool: """ Return this operator is zero operator or not. """ op = self.reduce() primitive: SparsePauliOp = op.primitive return op.coeff == 1 and len(op) == 1 and primitive.coeffs[0] == 0 def is_hermitian(self): return np.isreal(self.coeffs).all() and np.all(self.primitive.paulis.phase == 0)