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I have a rather easy-to-understand question.

I have a set of data and I want to estimate how good this data fit a standard normal distribution. To do so, I start with my code:

[f_p,m_p] = hist(data,128);
f_p = f_p/trapz(m_p,f_p);

x_th = min(data):.001:max(data);
y_th = normpdf(x_th,0,1);   

figure(1)
bar(m_p,f_p)
hold on
plot(x_th,y_th,'r','LineWidth',2.5)
grid on
hold off

Fig. 1 will look like the one below:

enter image description here

Easy to see that the fit is quite poor, altough the bell-shape can be spotted. The main problem resides therefore in the variance of my data.

To find out the proper number of occurrances my data-bins should own, I do this:

f_p_th = interp1(x_th,y_th,m_p,'spline','extrap');
figure(2)
bar(m_p,f_p_th)
hold on
plot(x_th,y_th,'r','LineWidth',2.5)
grid on
hold off

which will result in the following fig. :

enter image description here

Hence, the question is: how can I scale my data-block to match the Gaussian distribution as in Fig.2 ?

CAUTION

I wanna stress the focus on one point: I don't wanna find the best distribution fitting the data; the problem is reversed: starting from my data, I'd like to manipulate it in such a way that,in the end, its distribution reasonably fits the Gaussian one.

Unfortunately, at the moment, I don't have a real idea on how to perform this data "filter", "transform" or "manipulation".

Any support would be welcome.

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How is this question any different from your previous last two questions (this and this)? –  Eitan T Mar 21 '13 at 14:13
    
I didn't get any valuable answer up to now! So I try to tune the question in order to make it more reader-friendly. –  fpe Mar 21 '13 at 14:17
    
I think the best way to do it would be by editing, not by posting new questions. But that's just my opinion, of course. –  Eitan T Mar 21 '13 at 14:18
    
I do agree with your opinion, I actually feel rather dumb when re-posting the same question thousand times. Unfortunately I really would like to come up with a solution to this question. –  fpe Mar 21 '13 at 14:22
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3 Answers

up vote 2 down vote accepted

May be what you are interested in is rank-based inverse normal transformation. Basically you rank the data first an them convert it to normal distribution:

rank = tiedrank( data );
p = rank / ( length(rank) + 1 ); %# +1 to avoid Inf for the max point
newdata = norminv( p, 0, 1 );
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currently this is the procedure I would follow, but I need to test it more thoroughly. –  fpe Mar 21 '13 at 20:05
    
@fpe: Please don't leave the question without accepting some answer. Don't also forget to upvote those that you found useful. –  yuk Mar 27 '13 at 15:25
    
sorry but I'm on Easter holiday at the moment, with only limited access to the web. I'll fix everything next week. –  fpe Mar 28 '13 at 11:28
    
your answer looks like the one I've been searching for. Thanks! –  fpe Apr 2 '13 at 7:55
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What you are trying to do seems to match the problem of trying to find how random a set of data is. Supergaussian pdfs are those which have a greater probability around zero (or the mean, whatever it may be) than the Gaussian distribution, and are consequently more "sharply peaked" - much like your example. An example of this type of distribution is the Laplace distribution. Subgaussian pdfs are the opposite.

A measure of a dataset's closeness to the Gaussian distribution can be given in many ways... often this is done by using either the fourth-order moment, kurtosis (http://en.wikipedia.org/wiki/Kurtosis - MATLAB function kurt), or an information-theoretic measure such as negentropy (http://en.wikipedia.org/wiki/Negentropy ). Kurtosis is a bit dodgy if you have lots of outliers because the error gets raised to the power of 4, so negentropy is better.

If you don't understand the term "fourth-order moment", read a statistics textbook.

A comparison of these, and several other, measures of randomness (Gaussianity) is given in many texts on independent component analysis (ICA), as it is a core concept. A good resource on this is the book Independent Component Analysis, by Hyvarinen and Oja - http://books.google.co.uk/books/about/Independent_Component_Analysis.html?id=96D0ypDwAkkC .

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I haven't been able to really understand what this question, or your other recent similar ones, have been asking exactly.

Perhaps you have data that is normally distributed, and you want to make it be normally distributed with mean 0 and standard deviation 1?

If so, then subtract mu from your data and divide it by sigma, where mu is the mean of the data and sigma is its standard deviation. If your original data is normally distributed, then the result should be data that is normally distributed with mean 0 and standard deviation 1.

There's a function zscore in Statistics Toolbox to do exactly this for you.

But perhaps you meant something else?

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I know this trick and I applied it already, but it sounds to me as "faking" time series, since the distribution is not changed at all and I think it does not garantee for the gaussianity of the data-block. but I'm not an expert. –  fpe Mar 21 '13 at 20:04
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