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

2 visualizaciones (últimos 30 días)
xosro
xosro el 8 de Mzo. de 2018
Comentada: Torsten el 9 de Mzo. de 2018
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 $X_2$?

Iniciar sesión para responder a esta pregunta.

Respuesta aceptada

Akira Agata
Akira Agata el 9 de Mzo. de 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 comentarios
Mostrar 5 comentarios más antiguos
xosro
xosro el 9 de Mzo. de 2018
Editada: xosro el 9 de Mzo. de 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 el 9 de Mzo. de 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.

Iniciar sesión para comentar.

Más respuestas (0)

Categorías

Más información sobre Kernel Distribution en Help Center y File Exchange.

Etiquetas

Community Treasure Hunt

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

Start Hunting!

Translated by