# Compute Jordan normal form of matrix in Python / NumPy

In MATLAB you can compute the Jordan normal form of a matrix by using the the function `jordan`.

It there an equivalent function available in NumPy and SciPy?

• In sage, you are looking for jordan_form, see here. This is not scipy/numpy though. Dec 1, 2013 at 15:46
• Just a comment: Jordan form computation is numerically unstable in floating point --- you can e.g. try to compute the eigenvalues of the 4x4 matrix in sympy jordan_form docs. LAPACK (and therefore Scipy) will report that it has 4 distinct eigenvalues. Exact arithmetic gives however a 4-fold degenerate eigenvalue of 2.
– pv.
Jan 17, 2014 at 8:46

The MATLAB jordan function is from the Symbolic Math Toolbox, so it does not seem unreasonable to get its Python replacement from the SymPy library. Specifically, the `Matrix` class has the method `jordan_form`. You can pass a numpy array as an argument when you create a sympy Matrix. For example, the following is from the wikipedia article on the Jordan normal form:

``````In : import numpy as np

In : from sympy import Matrix

In : a = np.array([[5, 4, 2, 1], [0, 1, -1, -1], [-1, -1, 3, 0], [1, 1, -1, 2]])

In : m = Matrix(a)

In : m
Out:
Matrix([
[ 5,  4,  2,  1],
[ 0,  1, -1, -1],
[-1, -1,  3,  0],
[ 1,  1, -1,  2]])

In : P, J = m.jordan_form()

In : J
Out:
Matrix([
[1, 0, 0, 0],
[0, 2, 0, 0],
[0, 0, 4, 1],
[0, 0, 0, 4]])
``````
• Just a comment: Jordan form computation is numerically unstable in floating point --- you can e.g. try to compute the eigenvalues of the 4x4 matrix in sympy jordan_form docs. LAPACK (and therefore Scipy) will report that it has 4 distinct eigenvalues. Exact arithmetic gives however a 4-fold degenerate eigenvalue of 2.
– pv.
Jan 17, 2014 at 8:44

There's this implementation.

It will definitely not be as fast as MATLAB, though.

• That transforms the matrix into reduced row echolon form, which can be done more efficienty with sympy.Matrix(...).rref() However, I'm looking for the jordan normal form: en.wikipedia.org/wiki/Jordan_normal_form Dec 1, 2013 at 14:39