The most popular two-parameter distribution for modeling random variables on the (0, 1) interval is the beta distribution (e.g., Ferrari and Cribari-Neto, 2004; Smithson and Verkuilen, 2006). Less commonly used are the Kumaraswamy (1980), Lambda, and Logit-Logistic distributions. The cdfquantreg package introduces a family of two-parameter distributions with support (0, 1) that may be especially useful for modeling quantiles, and that also sometimes out-performs the other distributions.
Tadakimalla and Johnson (1982) replace the standard normal distribution in Johnsonâs SB distribution (Johnson, et al. 1995) with the standard logistic distribution, thus producing the logit-logistic distribution. A natural extension of this approach is to employ other transformations from (0, 1) to either the real line or nonnegative half of the real line, and expand the variety of standard distributions as well. The resulting family of distributions has the following useful properties:
The Distribution FamilyLet \(G(x,\mu,\sigma)\) denote a cdf with support (0, 1), a real-valued location parameter \(\mu\) and positive scale parameter \(\sigma\). \(G\) is defined as
\(G(x,\mu,\sigma) = F[U(H^{-1}(x),\mu,\sigma)]\),
where \(F\) is a standard cdf with support \(D_1\), \(H\) is a standard invertible cdf with support \(D_2\), and \(U: D_2 \rightarrow D_1\) is an appropriate transform for imposing the location and scale parameters. \(D_1\) and \(D_2\) are either \([-\infty,\infty]\) or \([0,\infty]\). If \(D_1 = D_2 = [-\infty,\infty]\) then
\(U(x,\mu,\sigma) = (x - \mu)/\sigma\),
and if \(D_1 = [0,\infty]\) then
\(U(x,\mu,\sigma) = (e^{- \mu}x)^{1/\sigma}\).
The members of this family that are included in this package have \(D_1 = D_2 = [-\infty,\infty]\).
If \(F\) is invertible, then the distribution has an explicit quantile. If \(G\) is differentiable then it has an explicit pdf. All of the distributions in this package share both properties.
There is a relation between pairs of these distributions in which \(F\) and \(H\) exchange roles. These pairs are âquantile-dualsâ of one another in the sense that oneâs cdf is the otherâs quantile, with the appropriate parameterization. We name these distributions with the nomenclature F-H (e.g., Cauchit-Logistic and Logit-Cauchy). See cdfquantreg_family for a list of the distributions included in this package.
Useful PropertiesFurther details and more general characterizations of this distribution family are available in Smithson and Shou (2016).
ExampleAn example is the Logit-Cauchy distribution. This distribution employs the Logistic cdf \(F\left( z \right) = \frac{1}{{1 + {{\rm{e}}^{ - z}}}}\) and the Cauchy cdf \(H\left( z \right) = \frac{{{{\tan }^{ - 1}}(z)}}{\pi } + \frac{1}{2}\). Inverting \(H\) and applying it and \(F\) to the equation above for \(G(x,\mu,\sigma)\) gives
\(G\left( {x,\mu ,\sigma } \right) = \frac{1}{{1 + \exp \left( {\frac{{\mu + \cot (\pi x)}}{\sigma }} \right)}}\),
and differentiating it gives the pdf
\(g\left( {x,\mu ,\sigma } \right) = \frac{{\pi {{\csc }^2}(\pi x){e^{\frac{{\mu + \cot (\pi x)}}{\sigma }}}}}{{\sigma {{\left( {{e^{\frac{{\mu + \cot (\pi x)}}{\sigma }}} + 1} \right)}^2}}}\).
Inverting \(F\) and the appropriate substitutions give us the quantile:
\({G^{ - 1}}\left( {\gamma ,\mu ,\sigma } \right) = \frac{{{{\tan }^{ - 1}}\left( {\sigma \left( {\frac{\mu }{\sigma } - \log \left( {\frac{1}{\gamma } - 1} \right)} \right)} \right)}}{\pi } + \frac{1}{2}\).
Note that, as described in property 3 above,
\({G^{ - 1}}\left( {\frac{1}{2} ,\mu ,\sigma } \right) = \frac{\tan ^{-1}(\mu )}{\pi }+\frac{1}{2}\),
and therefore
\(\mu = \tan \left(\pi Q\left( \frac{1}{2} \right)-\frac{1}{2}\right)\),
where \(Q(\gamma)\) denotes the quantile at \(\gamma\). Likewise, as in property 4,
\(G^{ - 1}\left(\frac{e}{e+1},\mu ,\sigma \right) = \frac{\tan ^{-1}(\mu +\sigma )}{\pi }+\frac{1}{2}\),
so that
\(\sigma = \tan \left(\pi \left(Q\left(\frac{e}{e+1} \right)-\frac{1}{2}\right)\right)-\tan\left[\pi \left(Q\left(\frac{1}{2} \right)-\frac{1}{2}\right)\right]\).
ReferencesFerrari, S., & Cribari-Neto, F. (2004). Beta regression for modelling rates and proportions. Journal of Applied Statistics, 31(7), 799-815.
Johnson, N. L., Kotz, S., & Balakrishnan, N (1995). Continuous Univariate Distributions, Vol. 2 (2nd ed.), Wiley, New York, NY.
Kumaraswamy, P. (1980). A generalized probability density function for double-bounded random processes. Journal of Hydrology, 46(1), 79-88.
Smithson, M. and Shou, Y. (2016). CDF-quantile distributions for modeling random variables on the unit interval. Unpublished Manuscript, The Australian National University, Canberra, Australia.
Smithson, M., & Verkuilen, J. (2006). A better lemon squeezer? Maximum-likelihood regression with beta-distributed dependent variables. Psychological methods, 11(1), 54-71.
Tadikamalla, P. R., & Johnson, N. L. (1982). Systems of frequency curves generated by transformations of logistic variables. Biometrika, 69(2), 461-465.
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