In this paper we derive some Jensen and Edmundson-Lah-Ribarič type inequalities for positive linear functionals and 3-convex functions. Obtained results are then applied to generalized means and power means, as well as to the generalized f -divergence functional. Examples with Zipf-Mandelbrot law are given. © Element, Zagreb
In this article, we present some new improvements of Jensen’s type inequalities via 4-convex and Gre...
Some inequalities in terms of the Gâteaux derivatives related to Jensen's inequality for convex fun...
Some inequalities in terms of the Gâteaux derivatives related\ud to Jensen's inequality for convex f...
In this paper we derive some Jensen and Edmundson–Lah– Ribarič type inequalities for positive linear...
In this paper we obtain some estimates for the generalized f-divergence functional via converses of ...
Summary: "In this paper we obtain some estimates for the generalized f-divergence functional via con...
In this paper, the authors establish some lower and upper bounds for the difference in the Edmundson...
AbstractIn this paper an inequality for 3-convex functions analogous to well-known Levinson's inequa...
Abstract In this paper, four new Green functions are used to generalize Levinson-type inequalities f...
By means of one new Jensen-type inequality for signed measures which is characterized via several di...
New inequalities for the general case of convex functions defined on linear spaces which improve the...
It is a fact that, the theory of inequalities, priding on a history of more than two centuries, play...
Inequalities lie at the heart of a great deal of mathematics.G. H. Hardy reported Harald Bohr as say...
Motivated by a recent refinement of the scalar Jensen inequality obtained via linear interpolation, ...
The main objective of this article is to establish mutual bounds for the Jensen operator inequality ...
In this article, we present some new improvements of Jensen’s type inequalities via 4-convex and Gre...
Some inequalities in terms of the Gâteaux derivatives related to Jensen's inequality for convex fun...
Some inequalities in terms of the Gâteaux derivatives related\ud to Jensen's inequality for convex f...
In this paper we derive some Jensen and Edmundson–Lah– Ribarič type inequalities for positive linear...
In this paper we obtain some estimates for the generalized f-divergence functional via converses of ...
Summary: "In this paper we obtain some estimates for the generalized f-divergence functional via con...
In this paper, the authors establish some lower and upper bounds for the difference in the Edmundson...
AbstractIn this paper an inequality for 3-convex functions analogous to well-known Levinson's inequa...
Abstract In this paper, four new Green functions are used to generalize Levinson-type inequalities f...
By means of one new Jensen-type inequality for signed measures which is characterized via several di...
New inequalities for the general case of convex functions defined on linear spaces which improve the...
It is a fact that, the theory of inequalities, priding on a history of more than two centuries, play...
Inequalities lie at the heart of a great deal of mathematics.G. H. Hardy reported Harald Bohr as say...
Motivated by a recent refinement of the scalar Jensen inequality obtained via linear interpolation, ...
The main objective of this article is to establish mutual bounds for the Jensen operator inequality ...
In this article, we present some new improvements of Jensen’s type inequalities via 4-convex and Gre...
Some inequalities in terms of the Gâteaux derivatives related to Jensen's inequality for convex fun...
Some inequalities in terms of the Gâteaux derivatives related\ud to Jensen's inequality for convex f...
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