Physics of Plasmas.
Vol. 25.
2018.
Generalization of cyclic refinements of Jensen’s inequality by Fink’s identity
We generalize cyclic refinements of Jensen’s inequality from a convex function to a higher-order convex function by means of Lagrange–Green’s function and Fink’s identity. We formulate the monotonicity of the linear functionals obtained from these identities utilizing the theory of inequalities for n-convex functions at a point. New Grüss- and Ostrowski-type bounds are found for identities associated with the obtained inequalities. Finally, we investigate the properties of linear functionals regarding exponential convexity and mean value theorems. © 2018, The Author(s).
Authors
Mehmood N.1
,
Butt S.I.1
,
Horváth L.2
,
Pečarić J.
3,
4
Publisher
Springer International Publishing
Language
English
Status
Published
Link
Number
51
Volume
2018
Year
2018
Organizations
- 1 Department of Mathematics, COMSATS, Institute of Information Technology, Lahore, Pakistan
- 2 Department of Mathematics, University of Pannonia, Veszprém, Hungary
- 3 Faculty of Textile Technology, University of Zagreb, Zagreb, Croatia
- 4 RUDN University, Moscow, Russian Federation
Keywords
Convex function; Fink’s identity; Green function; Grüss and Ostrowski inequality; n-Convex function at a point; Čebyšev functional
Date of creation
19.10.2018
Date of change
19.10.2018
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SIAM Journal on Mathematical Analysis.
Vol. 50.
2018.
P. 1175-1190