ANCOVA can be done with regression an using dummy variables in the design matrix for the effects that depend on the categorical variable.
A simple example is at
using the OLS class from scikits.statsmodels
Relevant part of construction of design matrix
xg includes group numbers/labels,
x1 is continuous explanatory variable
>>> dummy = (xg[:,None] == np.unique(xg)).astype(float)
>>> X = np.c_[x1, dummy[:,1:], np.ones(nsample)]
Estimate the model
>>> res2 = sm.OLS(y, X).fit()
>>> print res2.params
[ 1.00901524 3.08466166 -2.84716135 9.94655423]
>>> print res2.bse
[ 0.07499873 0.71217506 1.16037215 0.38826843]
>>> prstd, iv_l, iv_u = wls_prediction_std(res2)
"Test hypothesis that all groups have same intercept"
>>> R = [[0, 1, 0, 0],
... [0, 0, 1, 0]]
>>> print res2.f_test(R)
<F test: F=array([[ 91.69986847]]), p=[[ 8.90826383e-17]],
strongly rejected because differences in intercept are very large
Update (two and a half years later):
scikits.statsmodels has been renamed to
and to the question:
With the latest release of statsmodels, it is more convenient to use formulas for specifying categorical effects and interaction effects.
statsmodels uses patsy to handle the formulas and creates the design matrices.
More information is available at the links to the statsmodels documentation in http://stackoverflow.com/a/19495920/333700