Python: Biggest common divisor (gcd) for float, preferably in numpy

I am looking for an efficient way to determine the greatest common divisor of two floats with python. The routine should have the following layout

gcd(a, b, rtol=1e-05, atol=1e-08)
"""
Returns the greatest common divisor of a and b

Parameters
----------
a,b : float
    two floats for gcd
rtol, atol : float, optional
    relative and absolute tolerance

Returns
-------
gcd : float
    Greatest common divisor such that for x in [a,b]:
    np.mod(x,gcd) < rtol*x + atol 

.. _PEP 484:
    https://www.python.org/dev/peps/pep-0484/

"""

Example: gcd rational and irrational numbers

gcd(1., np.pi, rtol=0, atol=1e-5)should return (approximately) 1e-5how

In [1]: np.mod(np.pi,1e-5)
Out[1]: 2.6535897928590063e-06

In [2]: np.mod(1.,1e-5)
Out[2]: 9.9999999999181978e-06

I would rather use a library implementation rather than writing myself. The function fractions.gcd does not seem appropriate to me here, since I do not want to work with fractions, and it (obviously) does not have tolerance parameters.