New bounds for Shannon, Relative and Mandelbrot entropies via Hermite interpolating polynomial

Mehmood Nasir; Butt Saad Ihsan; Pečarić Ðilda; Pečarić Josip

doi:10.1515/dema-2018-0011

Demonstratio Mathematica (May 2018)

New bounds for Shannon, Relative and Mandelbrot entropies via Hermite interpolating polynomial

Mehmood Nasir,
Butt Saad Ihsan,
Pečarić Ðilda,
Pečarić Josip

Affiliations

Mehmood Nasir: Department of Mathematics, COMSATS, Institute of Information Technology, Lahore, Pakistan
Butt Saad Ihsan: Department of Mathematics, COMSATS, Institute of Information Technology, Lahore, Pakistan
Pečarić Ðilda: Catholic University of Croatia, Ilica 242, Zagreb, Croatia
Pečarić Josip: Faculty of Textile Technology, University of Zagreb, 10000 Zagreb, Croatia

DOI: https://doi.org/10.1515/dema-2018-0011
Journal volume & issue: Vol. 51, no. 1
pp. 112 – 130

Abstract

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To procure inequalities for divergences between probability distributions, Jensen’s inequality is the key to success. Shannon, Relative and Zipf-Mandelbrot entropies have many applications in many applied sciences, such as, in information theory, biology and economics, etc. We consider discrete and continuous cyclic refinements of Jensen’s inequality and extend them from convex function to higher order convex function by means of different new Green functions by employing Hermite interpolating polynomial whose error term is approximated by Peano’s kernal. As an application of our obtained results, we give new bounds for Shannon, Relative and Zipf-Mandelbrot entropies.

Published in Demonstratio Mathematica

ISSN: 2391-4661 (Online)
Publisher: De Gruyter
Country of publisher: Poland
LCC subjects: Science: Mathematics
Website: https://www.degruyter.com/journal/key/dema/html

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