TY - JOUR
T1 - Multivariate inverse trinomial distribution as a Lagrangian probability model
AU - Shimizu, Kunio
AU - Nishii, Nobuharu
AU - Minami, Mihoko
PY - 1997/1/1
Y1 - 1997/1/1
N2 - The univariate inverse trinomial distribution is so named because its cumulant generating function (c.g.f.) is the inverse of the c.g.f. of a trinomial distribution. The inverse trinomial distribution, which includes the inverse binomial and negative binomial distributions, is derivable from the Lagrangian expansion. The present paper pertains to the definition of the bivariate and multivariate inverse trinomial distributions through Lagrangian probability distributions. A multivariate inverse binomial distribution, generated by the method of reduction, converges to a multivariate inverse Gaussian distribution as a limiting form.
AB - The univariate inverse trinomial distribution is so named because its cumulant generating function (c.g.f.) is the inverse of the c.g.f. of a trinomial distribution. The inverse trinomial distribution, which includes the inverse binomial and negative binomial distributions, is derivable from the Lagrangian expansion. The present paper pertains to the definition of the bivariate and multivariate inverse trinomial distributions through Lagrangian probability distributions. A multivariate inverse binomial distribution, generated by the method of reduction, converges to a multivariate inverse Gaussian distribution as a limiting form.
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U2 - 10.1080/03610929708832002
DO - 10.1080/03610929708832002
M3 - Article
AN - SCOPUS:0031361863
SN - 0361-0926
VL - 26
SP - 1585
EP - 1598
JO - Communications in Statistics - Theory and Methods
JF - Communications in Statistics - Theory and Methods
IS - 7
ER -