RT - Journal Article
T1 - A Note on the Bivariate Maximum Entropy Modeling
JF - srtc-jsri
YR - 2011
JO - srtc-jsri
VO - 8
IS - 1
UR - http://jsri.srtc.ac.ir/article-1-78-en.html
SP - 29
EP - 48
K1 - . Fréchet class of distributions
K1 - hazard gradient
K1 - dependence
K1 - total positive of order 2.
AB - Let X=(X1 ,X2 ) be a continuous random vector. Under the assumption that the marginal distributions of X1 and X2 are given, we develop models for vector X when there is partial information about the dependence structure between X1 and X2. The models which are obtained based on well-known Principle of Maximum Entropy are called the maximum entropy (ME) models. Our results lead to characterization of some well-known bivariate distributions such as Generalized Gumbel, Farlie-Gumbel-Morgenstern and Clayton bivariate distributions. The relationship between ME models and some well known dependence notions are studied. Conditions under which the mixture of bivariate distributions are ME models are also investigated.
LA eng
UL http://jsri.srtc.ac.ir/article-1-78-en.html
M3 10.18869/acadpub.jsri.8.1.29
ER -