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Kybernetika 39(1):29-42, 2003.

Core Functions and Core Divergences of Regular Distributions.

Zdeněk Fabián and Igor Vajda


Abstract:

On bounded or unbounded intervals of the real line, we introduce classes of regular statistical families, called Johnson families because they are obtained using generalized Johnson transforms. We study in a rigorous manner the formerly introduced concept of core function of a distribution from a Johnson family, which is a modification of the well known score function and which in a one-to-one manner represents the distribution. Further, we study Johnson parametrized families obtained by Johnson transforms of location and scale families, where the location is replaced by a new parameter called Johnson location. We show that Johnson parametrized families contain many important statistical models. One form appropriately normalized $L_2$ distance of core functions of arbitrary distributions from Johnson families is used to define a core divergence of distributions. The core divergence of distributions from parametrized Johnson families is studied as a special case.


Keywords: Johnson transforms; generalized Johnson distributions; core function of distributions; core divergences of distributions;


AMS: 62E10; 62B10;


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BIB TeX

@article{kyb:2003:1:29-42,

author = {Fabi\'{a}n, Zden\v{e}k and Vajda, Igor},

title = {Core Functions and Core Divergences of Regular Distributions.},

journal = {Kybernetika},

volume = {39},

year = {2003},

number = {1},

pages = {29-42}

publisher = {{\'U}TIA, AV {\v C}R, Prague },

}


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