Natural Exponential Families with Quadratic Variance Functions

Carl N. Morris

doi:10.1214/aos/1176345690

March, 1982 Natural Exponential Families with Quadratic Variance Functions

Carl N. Morris

Ann. Statist. 10(1): 65-80 (March, 1982). DOI: 10.1214/aos/1176345690

Abstract

The normal, Poisson, gamma, binomial, and negative binomial distributions are univariate natural exponential families with quadratic variance functions (the variance is at most a quadratic function of the mean). Only one other such family exists. Much theory is unified for these six natural exponential families by appeal to their quadratic variance property, including infinite divisibility, cumulants, orthogonal polynomials, large deviations, and limits in distribution.

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Carl N. Morris. "Natural Exponential Families with Quadratic Variance Functions." Ann. Statist. 10 (1) 65 - 80, March, 1982. https://doi.org/10.1214/aos/1176345690

Information

Published: March, 1982

First available in Project Euclid: 12 April 2007

zbMATH: 0498.62015

MathSciNet: MR642719

Digital Object Identifier: 10.1214/aos/1176345690

Subjects:

Primary: 60E05

Secondary: 60E07 , 60F10 , 62E10 , 62E15 , 62E30

Keywords: Binomial distribution , Cumulants , exponential distribution , exponential families , gamma distribution , geometric distribution , hyperbolic secant distribution , Infinite divisibility , large deviations , limits in distribution , moments , natural exponential families , negative binomial distribution , normal distribution , orthogonal polynomials , Poisson distribution , quadratic variance function , variance function

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