would this not be a two parameter exponential family?
if not why not im struggling to understand
Answer:-
It belongs not belongs to exponential family.
As we can not identify c() and T(y) separately.
Hence it does not belongs to exponential family.
would this not be a two parameter exponential family? if not why not im struggling to...
he second form for one-parameter exponential family distributions, introduced during lecture 09.1, was Jy (y | θ) = b(y)ec(0)t(y)-d(0) Let η = c(0). If c is an invertible function, we can rewrite (1) as where η is called the natural, or canonical, parameter and K(n) = d(C-1(n)). Expression (2) is referred to as the canonical representation of the exponential family distribution (a) Function κ(η) is called the log-normalizer: it ensures that the distribution fy(y n) integrates to one. Show that,...
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