As a complement to the answer by @unutbu , you could also provide the distribution parameters for the test distribution in kstest. Suppose that we had some samples from a variable (and named them datax), and we wanted to check if those samples could possibly not come from a lognormal, a uniform, or a normal. Note that for scipy stats the way the input parameters are taken for each distribution varies a bit. Now, thanks to "args" (tuple or sequence) in kstest, is possible provide the arguments for the scipy.stats distribution you want to test against.

:) I also added the option of using a two-sample test, in case you wanted to do it either way:

```
import numpy as np
from math import sqrt
from scipy.stats import kstest, ks_2samp, lognorm
import scipy.stats
def KSSeveralDists(data,dists_and_args,samplesFromDists=100,twosampleKS=True):
returnable={}
for dist in dists_and_args:
try:
if twosampleKS:
try:
loc=dists_and_args[dist][0]
scale=dists_and_args[dist][1]
expression='scipy.stats.'+dist+'.rvs(loc=loc,scale=scale,size=samplesFromDists)'
sampledDist=eval(expression)
except:
sc=dists_and_args[dist][0]
loc=dists_and_args[dist][1]
scale=dists_and_args[dist][2]
expression='scipy.stats.'+dist+'.rvs(sc,loc=loc,scale=scale,size=samplesFromDists)'
sampledDist=eval(expression)
D,p=ks_2samp(data,sampledDist)
else:
D,p=kstest(data,dist,N=samplesFromDists,args=dists_and_args[dist])
except:
continue
returnable[dist]={'KS':D,'p-value':p}
return returnable
a=lambda m,std: m-std*sqrt(12.)/2.
b=lambda m,std: m+std*sqrt(12.)/2.
sz=2000
sc=0.5 #shape
datax=lognorm.rvs(sc,loc=0.,scale=1.,size=sz)
normalargs=(datax.mean(),datax.std())
#suppose these are the parameters you wanted to pass for each distribution
dists_and_args={'norm':normalargs,
'uniform':(a(*normalargs),b(*normalargs)),
'lognorm':[0.5,0.,1.]
}
print "two sample KS:"
print KSSeveralDists(datax,dists_and_args,samplesFromDists=sz,twosampleKS=True)
print "one sample KS:"
print KSSeveralDists(datax,dists_and_args,samplesFromDists=sz,twosampleKS=False)
```

which gives as an output something like:

two sample KS:
{'lognorm': {'KS': 0.023499999999999965, 'p-value': 0.63384188886455217}, 'norm': {'KS': 0.10600000000000004, 'p-value': 2.918766666723155e-10}, 'uniform': {'KS': 0.15300000000000002, 'p-value': 6.443660021191129e-21}}

one sample KS:
{'lognorm': {'KS': 0.01763415915126032, 'p-value': 0.56275820961065193}, 'norm': {'KS': 0.10792612430093562, 'p-value': 0.0}, 'uniform': {'KS': 0.14910036159697559, 'p-value': 0.0}}

Note: For the scipy.stats uniform distribution, a and b are taken as a=loc and b=loc + scale (see documentation).