betaR: The Two-parameter Beta Distribution Family Function

An object of class "vglmff" (see vglmff-class). The object is used by modelling functions such as vglm, rrvglm and vgam.

The two-parameter beta distribution is given by \(f(y) =\) $$(y-A)^{shape1-1} \times (B-y)^{shape2-1} / [Beta(shape1,shape2) \times (B-A)^{shape1+shape2-1}]$$ for \(A < y < B\), and \(Beta(.,.)\) is the beta function (see beta). The shape parameters are positive, and here, the limits \(A\) and \(B\) are known. The mean of \(Y\) is \(E(Y) = A + (B-A) \times shape1 / (shape1 + shape2)\), and these are the fitted values of the object.

For the standard beta distribution the variance of \(Y\) is \(shape1 \times shape2 / [(1+shape1+shape2) \times (shape1+shape2)^2]\). If \(\sigma^2= 1 / (1+shape1+shape2)\) then the variance of \(Y\) can be written \(\sigma^2 \mu (1-\mu)\) where \(\mu=shape1 / (shape1 + shape2)\) is the mean of \(Y\).

Another parameterization of the beta distribution involving the mean and a precision parameter is implemented in betaff.