# This code is part of a Qiskit project.
#
# (C) Copyright IBM 2019, 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.
"""Quadratic expression interface."""
from typing import List, Union, Dict, Tuple, Any
import numpy as np
from numpy import ndarray
from scipy.sparse import spmatrix, dok_matrix, tril, triu
from .quadratic_program_element import QuadraticProgramElement
from ..exceptions import QiskitOptimizationError
from ..infinity import INFINITY
from .linear_expression import ExpressionBounds
[documentos]class QuadraticExpression(QuadraticProgramElement):
"""Representation of a quadratic expression by its coefficients."""
def __init__(
self,
quadratic_program: Any,
coefficients: Union[
ndarray,
spmatrix,
List[List[float]],
Dict[Tuple[Union[int, str], Union[int, str]], float],
],
) -> None:
"""Creates a new quadratic expression.
The quadratic expression can be defined via an array, a list, a sparse matrix, or a
dictionary that uses variable names or indices as keys and stores the values internally as a
dok_matrix. We stores values in a compressed way, i.e., values at symmetric positions are
summed up in the upper triangle. For example, {(0, 1): 1, (1, 0): 2} -> {(0, 1): 3}.
Args:
quadratic_program: The parent QuadraticProgram.
coefficients: The (sparse) representation of the coefficients.
"""
super().__init__(quadratic_program)
self.coefficients = coefficients
def __getitem__(self, key: Tuple[Union[int, str], Union[int, str]]) -> float:
"""Returns the coefficient where i, j can be a variable names or indices.
Args:
key: The tuple of indices or names of the variables corresponding to the coefficient.
Returns:
The coefficient corresponding to the addressed variables.
"""
i, j = key
if isinstance(i, str):
i = self.quadratic_program.variables_index[i]
if isinstance(j, str):
j = self.quadratic_program.variables_index[j]
return self.coefficients[min(i, j), max(i, j)]
def __setitem__(self, key: Tuple[Union[int, str], Union[int, str]], value: float) -> None:
"""Sets the coefficient where i, j can be a variable names or indices.
Args:
key: The tuple of indices or names of the variables corresponding to the coefficient.
value: The coefficient corresponding to the addressed variables.
"""
i, j = key
if isinstance(i, str):
i = self.quadratic_program.variables_index[i]
if isinstance(j, str):
j = self.quadratic_program.variables_index[j]
self.coefficients[min(i, j), max(i, j)] = value
def _coeffs_to_dok_matrix(
self,
coefficients: Union[
ndarray,
spmatrix,
List[List[float]],
Dict[Tuple[Union[int, str], Union[int, str]], float],
],
) -> dok_matrix:
"""Maps given coefficients to a dok_matrix.
Args:
coefficients: The coefficients to be mapped.
Returns:
The given coefficients as a dok_matrix
Raises:
QiskitOptimizationError: if coefficients are given in unsupported format.
"""
if isinstance(coefficients, (list, ndarray, spmatrix)):
coefficients = dok_matrix(coefficients)
elif isinstance(coefficients, dict):
n = self.quadratic_program.get_num_vars()
coeffs = dok_matrix((n, n))
for (i, j), value in coefficients.items():
if isinstance(i, str):
i = self.quadratic_program.variables_index[i]
if isinstance(j, str):
j = self.quadratic_program.variables_index[j]
coeffs[i, j] = value
coefficients = coeffs
else:
raise QiskitOptimizationError(f"Unsupported format for coefficients: {coefficients}")
return self._triangle_matrix(coefficients)
@staticmethod
def _triangle_matrix(mat: dok_matrix) -> dok_matrix:
lower = tril(mat, -1, format="dok")
# `todok` is necessary because subtraction results in other format
return (mat + lower.transpose() - lower).todok()
@staticmethod
def _symmetric_matrix(mat: dok_matrix) -> dok_matrix:
upper = triu(mat, 1, format="dok") / 2
# `todok` is necessary because subtraction results in other format
return (mat + upper.transpose() - upper).todok()
@property
def coefficients(self) -> dok_matrix:
"""Returns the coefficients of the quadratic expression.
Returns:
The coefficients of the quadratic expression.
"""
return self._coefficients
@coefficients.setter
def coefficients(
self,
coefficients: Union[
ndarray,
spmatrix,
List[List[float]],
Dict[Tuple[Union[int, str], Union[int, str]], float],
],
) -> None:
"""Sets the coefficients of the quadratic expression.
Args:
coefficients: The coefficients of the quadratic expression.
"""
self._coefficients = self._coeffs_to_dok_matrix(coefficients)
[documentos] def to_array(self, symmetric: bool = False) -> ndarray:
"""Returns the coefficients of the quadratic expression as array.
Args:
symmetric: Determines whether the output is in a symmetric form or not.
Returns:
An array with the coefficients corresponding to the quadratic expression.
"""
coeffs = self._symmetric_matrix(self._coefficients) if symmetric else self._coefficients
return coeffs.toarray()
[documentos] def to_dict(
self, symmetric: bool = False, use_name: bool = False
) -> Dict[Union[Tuple[int, int], Tuple[str, str]], float]:
"""Returns the coefficients of the quadratic expression as dictionary, either using tuples
of variable names or indices as keys.
Args:
symmetric: Determines whether the output is in a symmetric form or not.
use_name: Determines whether to use index or names to refer to variables.
Returns:
An dictionary with the coefficients corresponding to the quadratic expression.
"""
coeffs = self._symmetric_matrix(self._coefficients) if symmetric else self._coefficients
if use_name:
return {
(
self.quadratic_program.variables[i].name,
self.quadratic_program.variables[j].name,
): v
for (i, j), v in coeffs.items()
}
else:
return {(int(i), int(j)): v for (i, j), v in coeffs.items()}
[documentos] def evaluate(self, x: Union[ndarray, List, Dict[Union[int, str], float]]) -> float:
"""Evaluate the quadratic expression for given variables: x * Q * x.
Args:
x: The values of the variables to be evaluated.
Returns:
The value of the quadratic expression given the variable values.
"""
x = self._cast_as_array(x)
# compute x * Q * x for the quadratic expression
val = x @ self.coefficients @ x
# return the result
return val
[documentos] def evaluate_gradient(self, x: Union[ndarray, List, Dict[Union[int, str], float]]) -> ndarray:
"""Evaluate the gradient of the quadratic expression for given variables.
Args:
x: The values of the variables to be evaluated.
Returns:
The value of the gradient quadratic expression given the variable values.
"""
x = self._cast_as_array(x)
# compute (Q' + Q) * x for the quadratic expression
val = (self.coefficients.transpose() + self.coefficients) @ x
# return the result
return val
def _cast_as_array(
self, x: Union[ndarray, List, Dict[Union[int, str], float]]
) -> Union[dok_matrix, np.ndarray]:
"""Converts input to an array if it is a dictionary or list."""
if isinstance(x, dict):
x_aux = np.zeros(self.quadratic_program.get_num_vars())
for i, v in x.items():
if isinstance(i, str):
i = self.quadratic_program.variables_index[i]
x_aux[i] = v
x = x_aux
if isinstance(x, list):
x = np.array(x)
return x
@property
def bounds(self) -> ExpressionBounds:
"""Returns the lower bound and the upper bound of the quadratic expression
Returns:
The lower bound and the upper bound of the quadratic expression
Raises:
QiskitOptimizationError: if the quadratic expression contains any unbounded variable
"""
l_b = u_b = 0.0
for (ind1, ind2), coeff in self.to_dict().items():
x = self.quadratic_program.get_variable(ind1)
if x.lowerbound == -INFINITY or x.upperbound == INFINITY:
raise QiskitOptimizationError(
f"Quadratic expression contains an unbounded variable: {x.name}"
)
y = self.quadratic_program.get_variable(ind2)
if y.lowerbound == -INFINITY or y.upperbound == INFINITY:
raise QiskitOptimizationError(
f"Quadratic expression contains an unbounded variable: {y.name}"
)
lst = []
if ind1 == ind2:
if x.lowerbound * x.upperbound <= 0.0:
# lower bound and upper bound have different signs
lst.append(0.0)
lst.extend([x.lowerbound**2, x.upperbound**2])
else:
lst.extend(
[
x.lowerbound * y.lowerbound,
x.lowerbound * y.upperbound,
x.upperbound * y.lowerbound,
x.upperbound * y.upperbound,
]
)
lst2 = [coeff * val for val in lst]
l_b += min(lst2)
u_b += max(lst2)
return ExpressionBounds(lowerbound=l_b, upperbound=u_b)
def __repr__(self):
# pylint: disable=cyclic-import
from ..translators.prettyprint import expr2str, DEFAULT_TRUNCATE
return f"<{self.__class__.__name__}: {expr2str(quadratic=self, truncate=DEFAULT_TRUNCATE)}>"
def __str__(self):
# pylint: disable=cyclic-import
from ..translators.prettyprint import expr2str
return f"{expr2str(quadratic=self)}"