Add to ORKGIn this paper we obtain some estimates for the generalized f-divergence functional via converses of the Jensen and Edmundson-Lah-Ribarič inequalities for convex functions, and then we obtain some estimates for the Kullback-Leibler divergence. All of the obtained results are applied to Zipf-Mandelbrot law and Zipf law. © 2018 Sobolev Institute of Mathematics
A refinement of the discrete Jensen’s inequality for convex functions defined on a convex subset in...
A refinement of the discrete Jensen’s inequality for convex functions\ud defined on a convex subset ...
In this paper, we consider the definition of “useful” Csiszár divergence and “useful” Zipf-Mandelbro...
Summary: "In this paper we obtain some estimates for the generalized f-divergence functional via con...
By means of one new Jensen-type inequality for signed measures which is characterized via several di...
The Jensen functional in its discrete form is brought in relation to the Csiszar divergence function...
In this paper we derive some Jensen and Edmundson-Lah-Ribarič type inequalities for positive linear ...
We started with the generalization of the Csiszár’s f -divergence. We stated and proved Jensen’s typ...
We started with the generalization of the Csiszar's f-divergence. We stated and proved Jensen's type...
In this paper we derive some Jensen and Edmundson–Lah– Ribarič type inequalities for positive linear...
Abstract Motivated by the method of interpolating inequalities that makes use of the improved Jensen...
Motivated by the method of interpolating inequalities that makes use of the improved Jensen-type ine...
Motivated by the method of interpolating inequalities that makes use of the improved Jensen-type ine...
In this paper we show how the Zipf-Mandelbrot law is connected to the theory of majorization. Firstl...
The Jensen's inequality plays a crucial role to obtain inequalities for divergences between probabil...
A refinement of the discrete Jensen’s inequality for convex functions defined on a convex subset in...
A refinement of the discrete Jensen’s inequality for convex functions\ud defined on a convex subset ...
In this paper, we consider the definition of “useful” Csiszár divergence and “useful” Zipf-Mandelbro...
Summary: "In this paper we obtain some estimates for the generalized f-divergence functional via con...
By means of one new Jensen-type inequality for signed measures which is characterized via several di...
The Jensen functional in its discrete form is brought in relation to the Csiszar divergence function...
In this paper we derive some Jensen and Edmundson-Lah-Ribarič type inequalities for positive linear ...
We started with the generalization of the Csiszár’s f -divergence. We stated and proved Jensen’s typ...
We started with the generalization of the Csiszar's f-divergence. We stated and proved Jensen's type...
In this paper we derive some Jensen and Edmundson–Lah– Ribarič type inequalities for positive linear...
Abstract Motivated by the method of interpolating inequalities that makes use of the improved Jensen...
Motivated by the method of interpolating inequalities that makes use of the improved Jensen-type ine...
Motivated by the method of interpolating inequalities that makes use of the improved Jensen-type ine...
In this paper we show how the Zipf-Mandelbrot law is connected to the theory of majorization. Firstl...
The Jensen's inequality plays a crucial role to obtain inequalities for divergences between probabil...
A refinement of the discrete Jensen’s inequality for convex functions defined on a convex subset in...
A refinement of the discrete Jensen’s inequality for convex functions\ud defined on a convex subset ...
In this paper, we consider the definition of “useful” Csiszár divergence and “useful” Zipf-Mandelbro...