Right-truncating a lognormal distribution
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Hello,
I would like to compute the probability that P(z<a) where
z=exp(x*beta+e) and e is distributed iid N(0,sigma^2).
I would like to evaluate the CDF of z, i.e.,
P(e< log(a)-x*beta),
for various values of x*beta. However, I know that z cannot take a value greater than a certain number, b. How can I obtain the truncated distribution to evaluate the above probability?
Many thanks in advance.
5 件のコメント
Matt J
2019 年 8 月 18 日
However, I know that z cannot take a value greater than a certain number, b.
This needs to be explained. If z is log-normal, how can it be bounded by b?
george pepper
2019 年 8 月 18 日
編集済み: george pepper
2019 年 8 月 18 日
Matt J
2019 年 8 月 18 日
But that contradicts your original claim that z is lognormal. Clearly z is not lognormal if it is bounded by b. You must say what the distribution actually is before we can talk about how to compute the CDF.
Matt J
2019 年 8 月 18 日
Possibly you want a conditional CDF?
prob(z<a | z<b)
george pepper
2019 年 8 月 18 日
採用された回答
I think this is right. How can I code this?
function out=conditionalCDF(a,b,x,beta,sigma)
pa=normcdf(log(a)-x*beta,0,sigma);
pb=normcdf(log(b)-x*beta,0,sigma);
out=min(1, pa./pb);
end
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