13

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?

2
  • 1
    In sage, you are looking for jordan_form, see here. This is not scipy/numpy though.
    – gg349
    Dec 1, 2013 at 15:46
  • 3
    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

2 Answers 2

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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 [1]: import numpy as np

In [2]: from sympy import Matrix

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

In [4]: m = Matrix(a)

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

In [6]: P, J = m.jordan_form()

In [7]: J
Out[7]: 
Matrix([
[1, 0, 0, 0],
[0, 2, 0, 0],
[0, 0, 4, 1],
[0, 0, 0, 4]])
1
  • 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
-2

There's this implementation.

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

1
  • 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
    – sighol
    Dec 1, 2013 at 14:39

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