mirror of
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8c2986026b
* fix(mypy): type annotations for linear algebra algorithms * refactor: remove linear algebra directory from mypy exclude
179 lines
5.0 KiB
Python
179 lines
5.0 KiB
Python
"""
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Resources:
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- https://en.wikipedia.org/wiki/Conjugate_gradient_method
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- https://en.wikipedia.org/wiki/Definite_symmetric_matrix
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"""
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from typing import Any
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import numpy as np
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def _is_matrix_spd(matrix: np.ndarray) -> bool:
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"""
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Returns True if input matrix is symmetric positive definite.
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Returns False otherwise.
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For a matrix to be SPD, all eigenvalues must be positive.
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>>> import numpy as np
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>>> matrix = np.array([
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... [4.12401784, -5.01453636, -0.63865857],
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... [-5.01453636, 12.33347422, -3.40493586],
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... [-0.63865857, -3.40493586, 5.78591885]])
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>>> _is_matrix_spd(matrix)
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True
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>>> matrix = np.array([
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... [0.34634879, 1.96165514, 2.18277744],
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... [0.74074469, -1.19648894, -1.34223498],
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... [-0.7687067 , 0.06018373, -1.16315631]])
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>>> _is_matrix_spd(matrix)
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False
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"""
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# Ensure matrix is square.
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assert np.shape(matrix)[0] == np.shape(matrix)[1]
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# If matrix not symmetric, exit right away.
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if np.allclose(matrix, matrix.T) is False:
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return False
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# Get eigenvalues and eignevectors for a symmetric matrix.
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eigen_values, _ = np.linalg.eigh(matrix)
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# Check sign of all eigenvalues.
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# np.all returns a value of type np.bool_
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return bool(np.all(eigen_values > 0))
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def _create_spd_matrix(dimension: int) -> Any:
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"""
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Returns a symmetric positive definite matrix given a dimension.
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Input:
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dimension gives the square matrix dimension.
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Output:
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spd_matrix is an diminesion x dimensions symmetric positive definite (SPD) matrix.
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>>> import numpy as np
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>>> dimension = 3
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>>> spd_matrix = _create_spd_matrix(dimension)
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>>> _is_matrix_spd(spd_matrix)
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True
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"""
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random_matrix = np.random.randn(dimension, dimension)
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spd_matrix = np.dot(random_matrix, random_matrix.T)
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assert _is_matrix_spd(spd_matrix)
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return spd_matrix
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def conjugate_gradient(
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spd_matrix: np.ndarray,
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load_vector: np.ndarray,
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max_iterations: int = 1000,
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tol: float = 1e-8,
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) -> Any:
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"""
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Returns solution to the linear system np.dot(spd_matrix, x) = b.
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Input:
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spd_matrix is an NxN Symmetric Positive Definite (SPD) matrix.
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load_vector is an Nx1 vector.
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Output:
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x is an Nx1 vector that is the solution vector.
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>>> import numpy as np
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>>> spd_matrix = np.array([
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... [8.73256573, -5.02034289, -2.68709226],
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... [-5.02034289, 3.78188322, 0.91980451],
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... [-2.68709226, 0.91980451, 1.94746467]])
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>>> b = np.array([
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... [-5.80872761],
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... [ 3.23807431],
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... [ 1.95381422]])
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>>> conjugate_gradient(spd_matrix, b)
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array([[-0.63114139],
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[-0.01561498],
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[ 0.13979294]])
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"""
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# Ensure proper dimensionality.
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assert np.shape(spd_matrix)[0] == np.shape(spd_matrix)[1]
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assert np.shape(load_vector)[0] == np.shape(spd_matrix)[0]
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assert _is_matrix_spd(spd_matrix)
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# Initialize solution guess, residual, search direction.
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x0 = np.zeros((np.shape(load_vector)[0], 1))
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r0 = np.copy(load_vector)
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p0 = np.copy(r0)
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# Set initial errors in solution guess and residual.
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error_residual = 1e9
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error_x_solution = 1e9
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error = 1e9
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# Set iteration counter to threshold number of iterations.
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iterations = 0
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while error > tol:
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# Save this value so we only calculate the matrix-vector product once.
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w = np.dot(spd_matrix, p0)
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# The main algorithm.
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# Update search direction magnitude.
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alpha = np.dot(r0.T, r0) / np.dot(p0.T, w)
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# Update solution guess.
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x = x0 + alpha * p0
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# Calculate new residual.
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r = r0 - alpha * w
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# Calculate new Krylov subspace scale.
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beta = np.dot(r.T, r) / np.dot(r0.T, r0)
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# Calculate new A conjuage search direction.
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p = r + beta * p0
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# Calculate errors.
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error_residual = np.linalg.norm(r - r0)
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error_x_solution = np.linalg.norm(x - x0)
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error = np.maximum(error_residual, error_x_solution)
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# Update variables.
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x0 = np.copy(x)
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r0 = np.copy(r)
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p0 = np.copy(p)
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# Update number of iterations.
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iterations += 1
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if iterations > max_iterations:
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break
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return x
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def test_conjugate_gradient() -> None:
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"""
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>>> test_conjugate_gradient() # self running tests
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"""
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# Create linear system with SPD matrix and known solution x_true.
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dimension = 3
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spd_matrix = _create_spd_matrix(dimension)
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x_true = np.random.randn(dimension, 1)
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b = np.dot(spd_matrix, x_true)
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# Numpy solution.
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x_numpy = np.linalg.solve(spd_matrix, b)
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# Our implementation.
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x_conjugate_gradient = conjugate_gradient(spd_matrix, b)
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# Ensure both solutions are close to x_true (and therefore one another).
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assert np.linalg.norm(x_numpy - x_true) <= 1e-6
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assert np.linalg.norm(x_conjugate_gradient - x_true) <= 1e-6
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if __name__ == "__main__":
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import doctest
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doctest.testmod()
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test_conjugate_gradient()
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