Some results on majorization and their applications

Some results on majorization and their applications

Majorization is a key concept in studying the Schur-convex property of a function, which is very useful in the study of stochastic orders. In this paper, some results on Schur-convexity have been developed. We have studied the conditions under which a function φ defined by φ(x)=∑i=1nuig(xi) will be...

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Veröffentlicht in:Journal of computational and applied mathematics 2016-08, Vol.301, p.161-177
Hauptverfasser: Kundu, Amarjit, Chowdhury, Shovan, Nanda, Asok K., Hazra, Nil Kamal
Format: Artikel
Sprache:eng
Schlagworte:
Computation
Gamma model
Generalized exponential model
Mathematical analysis
Mathematical models
Probability distribution functions
Schur-concave function
Schur-convex function
Statistics
Stochastic orders
Stochasticity
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Zusammenfassung:Majorization is a key concept in studying the Schur-convex property of a function, which is very useful in the study of stochastic orders. In this paper, some results on Schur-convexity have been developed. We have studied the conditions under which a function φ defined by φ(x)=∑i=1nuig(xi) will be Schur-convex. This fills some gap in the theory of majorization. The results so developed have been used in the case of generalized exponential and gamma distributions. During this, we have also developed some stochastic properties of order statistics. •Some useful results on majorization are developed.•This enriches the theory of majorization.•As applications, some distributions have been studied.
ISSN:0377-0427
1879-1778
DOI:10.1016/j.cam.2016.01.015