how can i estimate parameters of two independent gamma distributed variables with one same parameter in matlab?

1 view (last 30 days)
Suppose we have two independent random variables $X_1$ and $X_2$ where $X_1 \sim (\alpha_1, \beta)$ and $X_2 \sim (\alpha_2, \beta)$. how can i estimate three parameters $(\alpha_1, \alpha_2, \beta)$ from given data for $X_1$ and $X_2$?

Accepted Answer

Akira Agata
Akira Agata on 9 Mar 2018
I think one possible way to do this is to use maximum likelihood estimation method, like:
% Sample data
X1 = gamrnd(2,10,1000,1);
X2 = gamrnd(5,10,1000,1);
% Fit each data to Gamma distribution
pd1 = fitdist(X1,'Gamma');
pd2 = fitdist(X2,'Gamma');
% Assume beta = (beta1 + beta2)/2, and estimate alpha1 and alpha2
beta = (pd1.b + pd2.b)/2;
alpha1 = mle(X1,'pdf',@(X1,alpha1) gampdf(X1,alpha1,beta),'start',pd1.a);
alpha2 = mle(X2,'pdf',@(X2,alpha2) gampdf(X2,alpha2,beta),'start',pd2.a);
  7 Comments
xosro
xosro on 9 Mar 2018
Edited: xosro on 9 Mar 2018
I'm sorry. As it is mentioned above (Walter Roberson and Torsten), conditions 1 and 2 are correct. I was trying to describe the question in the form of simple, But it is possible that b is replaced with (1-a) but this is not used in general form (l1*X1+l2*X2+...+ln*Xn).
I may use the following form:
y=l(1)/sum(l)*X1+...+l(n)/sum(l)*Xn
I should try this.
Torsten
Torsten on 9 Mar 2018
You shouldn't do that since it makes your problem nonlinear in the l's.
You should work with
Y = l1*X1+...+ln*Xn
sum(li) = 1
li >= 0
and use lsqlin to estimate the li's.
Best wishes
Torsten.

Sign in to comment.

More Answers (0)

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!