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Cumulative information generating function and generalized Gini functions

Marco Capaldo, Antonio Di Crescenzo, Alessandra Meoli

2023Metrika16 citationsDOIOpen Access PDF

Abstract

Abstract We introduce and study the cumulative information generating function, which provides a unifying mathematical tool suitable to deal with classical and fractional entropies based on the cumulative distribution function and on the survival function. Specifically, after establishing its main properties and some bounds, we show that it is a variability measure itself that extends the Gini mean semi-difference. We also provide (i) an extension of such a measure, based on distortion functions, and (ii) a weighted version based on a mixture distribution. Furthermore, we explore some connections with the reliability of k -out-of- n systems and with stress–strength models for multi-component systems. Also, we address the problem of extending the cumulative information generating function to higher dimensions.

Topics & Concepts

MathematicsCumulative distribution functionMeasure (data warehouse)Applied mathematicsFunction (biology)Extension (predicate logic)Distortion functionReliability (semiconductor)StatisticsProbability density functionComputer scienceData miningEvolutionary biologyQuantum mechanicsDecoding methodsPhysicsPower (physics)Programming languageBiologyStatistical Distribution Estimation and ApplicationsProbabilistic and Robust Engineering DesignReliability and Maintenance Optimization
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