Magdalena Skolimowska, Jarosław Bartoszewicz (2006)
Applicationes Mathematicae
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We use weighted distributions with a weight function being a ratio of two densities to obtain some results of interest concerning life and residual life distributions. Our theorems are corollaries from results of Jain et al. (1989) and Bartoszewicz and Skolimowska (2006).
Fabrizio Durante, Giovanni Puccetti, Matthias Scherer, Steven Vanduffel (2016)
Dependence Modeling
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Matthev O. Ojo (2001)
Kragujevac Journal of Mathematics
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B. Kopociński, E. Trybusiowa (1966)
Applicationes Mathematicae
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Stevan Pilipović (1988)
Publications de l'Institut Mathématique
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A. Derdziński (1977)
Colloquium Mathematicae
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Grzegorz Łysik (1990)
Annales Polonici Mathematici
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Jan Mikusiński, Roman Sikorski
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CONTENTS Introduction........................................................................................................... 3 § 1. The abstraction principle............................................................................... 4 § 2. Fundamental sequences of continuous functions......................................... 5 § 3. The definition of distributions........................................................................ 9 § 4. Distributions as a generalization of...
R. Syski (1982)
Applicationes Mathematicae
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F. A. Haight (1972)
Applicationes Mathematicae
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Salman Izadkhah, Mohammad Amini, Gholam Reza Mohtashami Borzadaran (2015)
Applications of Mathematics
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We derive some new results for preservation of various stochastic orders and aging classes under weighted distributions. The corresponding reversed preservation properties as straightforward conclusions of the obtained results for the direct preservation properties, are developed. Damage model of Rao, residual lifetime distribution, proportional hazards and proportional reversed hazards models are discussed as special weighted distributions to try some of our results.
Magdalena Frąszczak, Jarosław Bartoszewicz (2012)
Applicationes Mathematicae
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Bartoszewicz and Benduch (2009) applied an idea of Lehmann and Rojo (1992) to a new setting and used the GTTT transform to define invariance properties and distances of some stochastic orders. In this paper Lehmann and Rojo's idea is applied to the class of models which is based on distributions which are compositions of distribution functions on [0,1] with underlying distributions. Some stochastic orders are invariant with respect to these models.