https://github.com/cran/sn
Tip revision: 1ec5ffba6d41a6c6a5a4de589f4a2a62934b26b2 authored by Adelchi Azzalini on 13 March 2004, 00:00:00 UTC
version 0.32-2
version 0.32-2
Tip revision: 1ec5ffb
INDEX
ais Australian Institute of Sport data
cp.to.dp conversion between equivalent parametrizations
dmsn multivariate skew-normal distribution
dmst multivariate skew-t distribution
dp.to.cp conversion between equivalent parametrizations
dsn skew-Normal distribution
dst skew-t distribution
frontier simulated sample from a skew-normal distribution
gamma1.to.lambda converts skewness to shape parameter of skew-
normal distribution
msn.affine affine trasnformation of a multivariate skew-normal
variate
msn.conditional cumulants and distribution of a skew-normal
variate after conditioning
msn.fit fitting multivariate skew-normal distributions
msn.marginal marginal compontents of a multivariate skew-
normal distribution
msn.mle maximum likelihood estimation for a multivariate
skew-normal distribution
msn.quantities quantities related to the multivariate skew-
normal distribution.
msn.cond.plot plot of the density of a conditional skew-normal
variate
mst.fit fitting multivariate skew-t distributions
mst.mle maximum likelihood estimation for a multivariate
skew-t distribution
pnorm2 bivariate normal integral
sn.2logL.profile profile twice loglikelihood for skew-normal
models
sn.cumulants cumulants of the skew-normal distribution
sn.Einfo expected Fisher information for skew-normal
distributions and regression models
sn.em fitting skew-normal variables using the EM algorithm
sn.mle maximum likelihood estimation for skew-normal models
sn.mmle modified MLE for skew-normal models
sn.mle.grouped maximum likelihood estimation for skew-normal grouped data
st.2logL.profile profile twice loglikelihood for skew-normal models
st.cumulants cumulants of skew-t distribution
st.mle maximum likelihood estimation for skew-t models
st.mle.grouped maximum likelihood estimation for skew-t grouped data
SN the library `sn': summary information
T.Owen Owen's function
zeta function `log(2*pnorm(x))' and its derivatives