Progress in Applied Mathematics
Non-Central Beta Type 3 Distribution
Abstract
Let $X$ and $Y$ be independent random variables, $X$ having a gamma distribution with shape parameter $a$ and $Y$ having a non-central
gamma distribution with shape and non-centrality parameters $b$ and
$\delta$, respectively. Define $ W ={X}/(X + 2 Y)$. Then, the random
variable $W$ has a non-central beta type 3 distribution, $W\sim
\textnormal{NCB3} (a,b;\delta)$. In this article we study several of its
properties. We also give a multivariate generalization of the
non-central beta type 3 distribution and derive its properties.
gamma distribution with shape and non-centrality parameters $b$ and
$\delta$, respectively. Define $ W ={X}/(X + 2 Y)$. Then, the random
variable $W$ has a non-central beta type 3 distribution, $W\sim
\textnormal{NCB3} (a,b;\delta)$. In this article we study several of its
properties. We also give a multivariate generalization of the
non-central beta type 3 distribution and derive its properties.
Full Text:
PDFDOI: http://dx.doi.org/10.3968/j.pam.1925252820120402.1675
DOI (PDF): http://dx.doi.org/10.3968/g3076
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