Levinson-type inequalities via new Green functions and Montgomery identity

In this study, Levinson-type inequalities are generalized by using new Green functions and Montgomery identity for the class of k-convex functions (k ≥ 3). Čebyšev-, Grüss- and Ostrowski-type new bounds are found for the functionals involving data points of two types. Moreover, a new functional is introduced based on f {\mathfrak{f}} divergence and then some estimates for new functional are obtained. Some inequalities for Shannon entropies are obtained too. © 2020 Muhammad Adeel et al., published by De Gruyter 2020.

Authors
Adeel M.1, 2 , Khan K.A.1, 2 , Pečarić Ð.3 , Pečarić J. 4
Publisher
De Gruyter
Number of issue
1
Language
English
Pages
632-652
Status
Published
Volume
18
Year
2020
Organizations
  • 1 Department of Mathematics, University of Sargodha, Sargodha, 40100, Pakistan
  • 2 Department of Mathematics, University of Central Punjab, Lahore, Pakistan
  • 3 Catholic University of Croatia, Zagreb, Ilica, 242, Croatia
  • 4 Rudn University, Moscow, Russian Federation
Keywords
information theory; Levinson's inequality; Montgomery identity
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