The samples you show are not obviously and consistently multi-modal: they show a preference for the center. These are conditions suitable for the use of the Central Limit Thereom: you will likely end up with a Normal distribution for statistical purposes.
Probability distribution of a multiple variable sum
2 vues (au cours des 30 derniers jours)
Afficher commentaires plus anciens
Hi everyone,
I’m coming here for really advance statistic/probability advice, which I'm a beginner in this field.
I would like to know the probability of a variable TAU_total such as TAU_total=TAU1+TAU2+….+TAU129.
The variables TAUi are independent of each other.
For each one of them, I have a sample of 20,000 values which you can see some examples of their distribution on the histograms in the attachment.
My question is the following: I would like to be able to determine the probability of TAU_total to be superior to a certain value Xmax.
Thank you for your help,
Regards,
Rémy
4 commentaires
Walter Roberson
le 11 Mai 2019
The Wikipedia article about CLT talks about extensions beyond iid.
I did a quick simulation of size equal to the original question, using randn with a range of standard deviations. std() of the totals was roughly 10% larger than sum() of the individual std, divided by sqrt(129) . The calculations for iid where thus not exactly applicable, but they were pretty close. hist() of the total looks like model illustrations of a drawing a pure normal distribution until I got up to 56 bins in the histogram, at which point you could finally start to see statistical differences compared to a perfect curve.
John D'Errico
le 11 Mai 2019
Admittedly, when I first saw this question, I read it as the sum of 12 terms, not 129. 129 terms will cause pretty much anything to look as if it is normally distributed. :)
N = 129;
alph = rand(1,N)*2 + .5;
bet = rand(1,N)*2 + .5;
betamean = alph./(alph + bet);
betavar = alph.*bet./((alph + bet).^2.*(alph+ bet+1));
CLTmean = sum(betamean);
CLTvar = sum(betavar);
CLTstd = sqrt(CLTvar);
nsim = 100000;
X = zeros(nsim,N);
for i = 1:N
X(:,i) = betarnd(alph(i),bet(i),[1,nsim]);
end
MCsum = sum(X,2);
MCmean = mean(MCsum);
MCvar = var(MCsum);
MCstd = std(MCsum);
[CLTmean, MCmean;CLTvar,MCvar;CLTstd,MCstd]
ans =
61.6267682855143 61.6366984653151
7.56366115010423 7.53757246937701
2.75021111009759 2.74546398071018
Comparing the histograms, we see:
histogram(MCsum,100,'norm','pdf')
hold on
fplot(@(x) normpdf(x,CLTmean,CLTstd),[min(MCsum),max(MCsum)],'r')
So I don't see any problem using either approach. With only 12 terms in the sum, I'd probably go with the Monte Carlo.
Réponse acceptée
Torsten
le 10 Mai 2019
Modifié(e) : Walter Roberson
le 10 Mai 2019
Take samples from your empirical data and use Monte-Carlo-simulation to determine the above probability.
This code should help to take the samples:
Plus de réponses (1)
Voir également
Catégories
En savoir plus sur Histograms dans Help Center et File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
Vous pouvez également sélectionner un site web dans la liste suivante :
Amériques
- América Latina (Español)
- Canada (English)
- United States (English)
Europe
- Belgium (English)
- Denmark (English)
- Deutschland (Deutsch)
- España (Español)
- Finland (English)
- France (Français)
- Ireland (English)
- Italia (Italiano)
- Luxembourg (English)
- Netherlands (English)
- Norway (English)
- Österreich (Deutsch)
- Portugal (English)
- Sweden (English)
- Switzerland
- United Kingdom(English)
Asie-Pacifique
- Australia (English)
- India (English)
- New Zealand (English)
- 中国
- 日本Japanese (日本語)
- 한국Korean (한국어)