To teach myself PyMC I am trying to define a simple logistic regression. But I get a ZeroProbability error, and does not understand exactly why this happens or how to avoid it.

Here is my code:

import pymc
import numpy as np

x = np.array([85, 95, 70, 65, 70, 90, 75, 85, 80, 85])
y = np.array([1., 1., 0., 0., 0., 1., 1., 0., 0., 1.])

w0 = pymc.Normal('w0', 0, 0.000001)    # uninformative prior (any real number)
w1 = pymc.Normal('w1', 0, 0.000001)    # uninformative prior (any real number)

def logistic(w0=w0, w1=w1, x=x):
    return 1.0 / (1. + np.exp(-(w0 + w1 * x)))

observed = pymc.Bernoulli('observed', logistic, value=y, observed=True)

And here is the trace back with the error message:

Traceback (most recent call last):
  File "/Library/Python/2.7/site-packages/IPython/core/interactiveshell.py", line 2883, in run_code
    exec(code_obj, self.user_global_ns, self.user_ns)
  File "<ipython-input-2-43ed68985dd1>", line 24, in <module>
    observed = pymc.Bernoulli('observed', logistic, value=y, observed=True)
  File "/usr/local/lib/python2.7/site-packages/pymc/distributions.py", line 318, in __init__
  File "/usr/local/lib/python2.7/site-packages/pymc/PyMCObjects.py", line 772, in __init__
    if not isinstance(self.logp, float):
  File "/usr/local/lib/python2.7/site-packages/pymc/PyMCObjects.py", line 929, in get_logp
    raise ZeroProbability(self.errmsg)
ZeroProbability: Stochastic observed's value is outside its support,
 or it forbids its parents' current values.

I suspect np.exp to be causing the trouble, since it returns inf when the linear equation becomes too high. I know there are other ways to define a logistic regression using PyMC (her is one), but I am interested in knowing why this approach does not work, and how I can define the regression using the Bernoulli object instead of using bernoulli_like


When you create a your normal stochastastic with pymc.Normal('w0', 0, 0.000001), PyMC2 initializes the value with a random draw from the prior distribution. Since your prior is so diffuse, this can be a value which is so unlikely that the posterior is effectively zero. To fix, just request a reasonable initial value for your Normal:

w0 = pymc.Normal('w0', 0, 0.000001, value=0)
w1 = pymc.Normal('w1', 0, 0.000001, value=0)

Here is a notebook with a few more details.


You have to put some sort of bound on the probability returned by the logistic function.

Maybe something like

def logistic(w0=w0, w1=w1, x=x):
    tol = 1e-9
    res = 1.0 / (1. + np.exp(-(w0 + w1 * x)))
    return np.maximum(np.minimum(res, 1 - tol), tol)

I think you forgot the negative inside the exp() function, too.

  • Thanks for noticing the missing negative sign. Your solution solves the same problem as Abrahams solution, but I think the solution proposed by Abraham is preferable for the two reasons: 1) It is shorter. 2) The code will be easier to understand. – elgehelge Jan 2 '15 at 11:46

@hahdawg's answer is good, but here's something else to consider.

For your uninformative priors on w0 and w1 I would first do an eyeball fit and then use uniforms with limits. Obviously your w1 is going to be around 1/15 = .07, so a range like .04 to 1.2 might do it. w0 is going to be in the range of -80/15 = -5.3, so something like -7 to -3 could do it.

I'm just saying this because exp can easily go bananas, so you have to be careful what you feed it. If your inverse logit function comes out with a value too close to 0 or 1, logistic regression is guaranteed to break.


Out of curiosity, are you using a thin argument in your call to sample? There was a bug related to that, and it may be the culprit here.

Besides, thinning is not worthwhile in any case.

  • I get the error already when defining the observed variable. Not when I sample. So the thin argument has nothing to do with this error. – elgehelge Jan 2 '15 at 11:34

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