Computing Hermite normal form and Smith normal form with transformation matrices.
- Document: https://hsnf.readthedocs.io/en/latest/
- Document(develop): https://lan496.github.io/hsnf/develop
- Github: https://github.com/lan496/hsnf
- PyPI: https://pypi.org/project/hsnf
import numpy as np
from hsnf import column_style_hermite_normal_form, row_style_hermite_normal_form, smith_normal_form
# Integer matrix to be decomposed
M = np.array(
[
[-6, 111, -36, 6],
[5, -672, 210, 74],
[0, -255, 81, 24],
]
)
# Smith normal form
D, L, R = smith_normal_form(M)
"""
D = array([
[ 1 0 0 0]
[ 0 3 0 0]
[ 0 0 2079 0]])
"""
assert np.allclose(L @ M @ R, D)
assert np.around(np.abs(np.linalg.det(L))) == 1 # unimodular
assert np.around(np.abs(np.linalg.det(R))) == 1 # unimodular
# Row-style hermite normal form
H, L = row_style_hermite_normal_form(M)
"""
H = array([
[ 1 0 420 -2522]
[ 0 3 1809 -10860]
[ 0 0 2079 -12474]])
"""
assert np.allclose(L @ M, H)
assert np.around(np.abs(np.linalg.det(L))) == 1 # unimodular
# Column-style hermite normal form
H, R = column_style_hermite_normal_form(M)
"""
H = array([
[ 3 0 0 0]
[ 0 1 0 0]
[1185 474 2079 0]])
"""
assert np.allclose(np.dot(M, R), H)
assert np.around(np.abs(np.linalg.det(R))) == 1 # unimodularhsnf works with Python3.8+ and can be installed via PyPI:
pip install hsnfor in local:
git clone git@github.com:lan496/hsnf.git
cd hsnf
pip install -e .[dev,docs]- http://www.dlfer.xyz/post/2016-10-27-smith-normal-form/
- I appreciate Dr. D. L. Ferrario's instructive blog post and his approval for referring his scripts.
- CSE206A: Lattices Algorithms and Applications (Spring 2014)
- Henri Cohen, A Course in Computational Algebraic Number Theory (Springer-Verlag, Berlin, 1993).
![@pre-commit-ci[bot]](https://avatars.githubusercontent.com/in/68672?s=64&v=4){kind=small}
![@dependabot[bot]](https://avatars.githubusercontent.com/in/29110?s=64&v=4){kind=small}