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
Levinson type inequalities are generalized by using Hermite interpolating polynomial for the class o...
We establish new refinements and improvements of Popoviciu’s inequality for n-convex functions using...
Abstract In this paper, we present some interesting results related to the bounds of the Shannon and...
To procure inequalities for divergences between probability distributions, Jensen's inequality is th...
To procure inequalities for divergences between probability distributions, Jensen's inequality is th...
The Jensen's inequality has tremendous implications in many fields of modern analysis. It helps comp...
We estimated the different entropies like Shannon entropy, Rényi divergences, Csiszar divergence by ...
Shannon and Zipf-Mandelbrot entropies have many applications in many applied sciences, for example, ...
Shannon and Zipf-Mandelbrot entropies have many applications in many applied sciences, for example, ...
The main purpose of this paper is to find new estimations for the Shannon and Zipf–Mandelbrot ...
In this work, we estimated the different entropies like Shannon entropy, Renyi divergences, Csiszar ...
Hermite’s interpolation is utilized to establish a new generalization of an inequality for higher or...
In this work, we estimated the different entropies like Shannon entropy, Renyi divergences, Csiszar ...
In this work, Levinson type inequalities involving two types of data points are proved using Green f...
In this work, some new functional of Jensen-type inequalities are constructed using Shannon entropy,...
Levinson type inequalities are generalized by using Hermite interpolating polynomial for the class o...
We establish new refinements and improvements of Popoviciu’s inequality for n-convex functions using...
Abstract In this paper, we present some interesting results related to the bounds of the Shannon and...
To procure inequalities for divergences between probability distributions, Jensen's inequality is th...
To procure inequalities for divergences between probability distributions, Jensen's inequality is th...
The Jensen's inequality has tremendous implications in many fields of modern analysis. It helps comp...
We estimated the different entropies like Shannon entropy, Rényi divergences, Csiszar divergence by ...
Shannon and Zipf-Mandelbrot entropies have many applications in many applied sciences, for example, ...
Shannon and Zipf-Mandelbrot entropies have many applications in many applied sciences, for example, ...
The main purpose of this paper is to find new estimations for the Shannon and Zipf–Mandelbrot ...
In this work, we estimated the different entropies like Shannon entropy, Renyi divergences, Csiszar ...
Hermite’s interpolation is utilized to establish a new generalization of an inequality for higher or...
In this work, we estimated the different entropies like Shannon entropy, Renyi divergences, Csiszar ...
In this work, Levinson type inequalities involving two types of data points are proved using Green f...
In this work, some new functional of Jensen-type inequalities are constructed using Shannon entropy,...
Levinson type inequalities are generalized by using Hermite interpolating polynomial for the class o...
We establish new refinements and improvements of Popoviciu’s inequality for n-convex functions using...
Abstract In this paper, we present some interesting results related to the bounds of the Shannon and...