askewchan

Would urlparse be better? docs.python.org/2/library/urlparse.html

@Berzerker What's a SMAL Hawk program? Google wants me to change my search to small hawks :P

Hard to define importance I suppose

Heh, thanks, it's fun

@Tshepang yep, it's my home

@sean I guess so

my pleasure as well. good luck to you

Yes, thanks :)

no, s should be

yes I see

yes

I'm only multiplying the count. NOt actually generating more samples in that region.

Oh, I think I understand your point now

I mean, is the code I sent correctly converting a uniform distribution to the one defined by normpdf?

But if I'm just misunderstanding you and wasting your time please feel free to get along with your business :)

I might not have the normalization right

In [325]: x = np.arange(-10,10)
In [326]: unif = np.random.uniform(size = x.size)
In [327]: def normpdf(x):
    return np.exp(-x**2)/np.sqrt(2*np.pi)
   .....:
In [328]: s = unif*normpdf(x)

So what's wrong with this?

OK

so then p(x) = exp(-x**2)

right?

for example, a uniform pdf would be: p(x) = 1/N

it's the derivative of the CDF

probability distribution function

perhaps I'm wrong, but isn't uniform * pdf just what you want?

Oh, I see. Why not generate the sample from the pdf?

Inverse in what sense? It seems to me you are trying to go there and back again.

what is the equation you're trying to solve?

Then I don't understand why it's not better to just use the sum of the three pdfs, as Zhenya suggested

Oh, but the goal is to have a distribution in the end?

eof?

Oh yeah I'm looking in the comments now

oh?

I'll see if I can write up an answer soon.

And you should be able to make an analytical formula for this.

Hm, I'm looking at your previous question now

Good luck!

if you want to see what x and p look like, reduce bins=10 and print x and print p to see what they are

You're welcome, very glad to help!

I should have called it`pdf`, perhaps

ah, ok so all you need to change is the line with UnivariateSpline so that you are smoothing U..S..(x, p) not US(x, 0.5)

x, p = np.histogram(s)

OK so if your sample of size 15 is s, then you can get a PDF by doing this:

So you can get an approximate of the PDF by using np.histogram

No, but you said you could generate a distribution. Is that true? In what form is the distribution?

UnivariateSpline takes two lists or arrays, x and y which must have the same shape. You've given it x and 0.5, so they're not the same shape. I've used p and x where p is the probability of finding x (plus or minus dx). p is basically your histogram height, or probability distribution, which you said you could generate.

@Naji Sorry about that, it should work now, with a working example of a normal distribution.

Then I think you should edit your question to be more clear. This answers your question assuming you "have the distribution".