Description Usage Arguments Value Author(s) References See Also Examples
This function yields the cdf of a mixture distribution consisting of a point mass (at the lower end), a uniform distribution (above the point mass and below the log-normal distribution) and a log-normal distribution.
1 | cdf.mix.LN(q, pi0, thres0 = 0, pi1, thres1, mu, sigma)
|
q |
a vector of quantiles. |
pi0 |
the probability mass at thres0. |
thres0 |
the location of the probability mass at the lower end of the distribution. |
pi1 |
the probability mass of the uniform distribution. |
thres1 |
the upper bound of the uniform distribution. |
mu |
the parameter mu of the Dagum distribution as defined by the function GB2. |
sigma |
the parameter sigma of the Dagum distribution as defined by the function GB2. |
returns the cumulative density for the given quantiles.
Alexander Sohn
Sohn, A., Klein, N., Kneib. T. (2014): A New Semiparametric Approach to Analysing Conditional Income Distributions, in: SOEPpapers, No. 676.
1 2 3 4 5 6 7 8 | pi0.s<-0.2
pi1.s<-0.1
thres0.s<-0
thres1.s<-25000
mu.s<-10
sigma.s<-2
cdf.mix.LN(50000,pi0.s,thres0.s,pi1.s,thres1.s,mu.s,sigma.s)
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