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solar-conflux/python/denoising/modules/tridiagonal.py

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import numpy as np
import scipy as sp
def assert_valid_tridiagonal(a, c, e):
"""
Validates a tridiagonal matrix.
"""
assert len(a) == len(c) + 1 == len(e) + 1
def create(a, c, e):
"""
Validates a tridiagonal matrix before creating it.
"""
assert_valid_tridiagonal(a, c, e)
return (a, c, e)
def decompose(a, c, e):
"""
Computes the LU decomposition of a tridiagonal matrix.
"""
assert_valid_tridiagonal(a, c, e)
α = np.zeros(len(c))
β = a.copy()
for i in range(len(c)):
α[i] = e[i] / β[i]
β[i + 1] -= c[i] * α[i]
# Sanity check
if len(a) <= 10:
assert np.allclose(
to_array(a, c, e),
to_array(*from_lower(α)) @ to_array(*from_upper(β, c))
)
return (α, β)
def to_csr(a, c, e):
"""
Converts a tridiagonal matrix into a scipy csr sparse matrix.
"""
assert_valid_tridiagonal(a, c, e)
return sp.sparse.diags((a, c, e), offsets=(0, 1, -1), format="csr")
def to_array(a, c, e):
"""
Converts a tridiagonal matrix into a numpy matrix.
"""
assert_valid_tridiagonal(a, c, e)
return to_csr(a, c, e).toarray()
def from_lower(α):
"""
Turns the lower vector of a decomposition into a tridiagonal matrix.
Example ussage:
```py
α, β = decompose(m)
print(from_lower(α))
```
"""
return create(np.ones(len(α) + 1), np.zeros(len(α)), α)
def from_upper(β, c):
"""
Turns the upper vectors of a decomposition into a tridiagonal matrix.
Example ussage:
```py
α, β = decompose((a, c, e))
print(from_upper(β, c))
```
"""
return create(β, c, np.zeros(len(c)))
def solve_lower(α, rhs):
"""
Solve a linear system of equations Mx = v
where M is a lower triangular matrix constructed
by LU decomposing a tridiagonal matrix.
"""
x = np.zeros_like(rhs)
x[0] = rhs[0]
for i in range(1, len(rhs)):
x[i] = rhs[i] - α[i - 1] * x[i - 1]
if len(α) <= 10:
assert np.allclose(to_array(*from_lower(α)) @ x, rhs)
return x
def solve_upper(β, c, rhs):
"""
Solve a linear system of equations Mx = v
where M is an upper triangular matrix constructed
by LU decomposing a tridiagonal matrix.
"""
x = np.zeros_like(rhs)
x[-1] = rhs[-1] / β[-1]
for i in reversed(range(len(rhs) - 1)):
x[i] = (rhs[i] - c[i] * x[i+1]) / β[i]
if len(β) <= 10:
assert np.allclose(to_array(*from_upper(β, c)) @ x, rhs)
return x
def solve(a, c, e, rhs):
"""
Solves a system of linear equations defined by a tridiagonal matrix.
"""
assert_valid_tridiagonal(a, c, e)
α, β = decompose(a, c, e)
x = solve_upper(β, c, solve_lower(α, rhs))
if len(α) <= 10:
assert np.allclose(to_array(a, c, e)@x, rhs)
return x
def multiply_vector(a, c, e, x):
"""
Performs a matrix-vector multiplication where the matrix is tridiagonal.
"""
assert_valid_tridiagonal(a, c, e)
assert len(x) == len(a)
result = np.zeros_like(x)
for i in range(len(x)):
result[i] = a[i] * x[i]
if i > 0:
result[i] += e[i - 1] * x[i - 1]
if i < len(x) - 1:
result[i] += c[i] * x[i + 1]
# Sanity check
if len(a) <= 10:
assert np.allclose(to_array(a, c, e) @ x, result)
return result
def largest_eigenvalue(a, c, e, initial_x, kmax):
"""
Computes the largest eigenvalue of a positive definite tridiagonal matrix.
"""
assert_valid_tridiagonal(a, c, e)
x = initial_x
for _ in range(kmax):
q = multiply_vector(a, c, e, x)
assert not np.allclose(q, 0) # Sanity check
x = q/np.linalg.norm(q)
# Computes the eigenvalue from the eigenvector
eigenvalue = (x @ multiply_vector(a, c, e, x)) / (x @ x)
# Sanity check
if len(initial_x) <= 10:
actual_eigenvalues, _ = np.linalg.eig(to_array(a, c, e))
assert np.allclose(
0,
np.min(
np.abs(
actual_eigenvalues - eigenvalue
)
)
)
return eigenvalue
def add(a, b):
"""
Adds two tridiagonal matrices.
"""
assert_valid_tridiagonal(*a)
assert_valid_tridiagonal(*b)
assert len(a[0]) == len(b[0])
result = create(a[0] + b[0], a[1] + b[1], a[2] + b[2])
# Sanity check
if len(a[0]) <= 10:
assert np.allclose(to_array(*result), to_array(*a) + to_array(*b))
return result
def identity(n):
"""
Returns the tridiagonal identity n*n matrix.
"""
assert n > 0 # Sanity check
return create(np.ones(n), np.zeros(n - 1), np.zeros(n - 1))
def scale(s, m):
"""
Multiplies a tridiagonal matrix by a scalar
"""
assert_valid_tridiagonal(*m)
result = create(s * m[0], s * m[1], s * m[2])
# Sanity check
if len(m[0]) <= 10:
assert np.allclose(result, s * to_array(*m))
return result
def transpose(a, c, e):
"""
Computes the transpose of a tridiagonal matrix.
"""
return create(a, e, c)
# main()