AbstractUsing an inequality for convex functions by Andrica and Ra°a [1] (2.1), we point out a new inequality for log mappings and apply it in information theory for the Shannon entropy and mutual information
In this paper we derive some upper bounds for the relative entropy D(p || q) of two probability dist...
We introduce the notion of an interpolating path on the set of probability measures on finite graphs...
AbstractA new analytic inequality for logarithms which provides a converse to arithmetic meangeometr...
Using an inequality for convex functions by Andrica and Ra°a [1] (2.1), we point out a new inequalit...
AbstractUsing an inequality for convex functions by Andrica and Ra°a [1] (2.1), we point out a new i...
In this paper we discuss new inequalities for logarithmic mapping and apply them in Information Theo...
Using the concavity property of the log mapping and the weighted arithmetic mean - geometric mean in...
New inequalities for convex mappings of a real variable and applications in Information Theory for S...
We show that an information-theoretic property of Shannon's entropy power, known as concavity of ent...
By the use of a counterpart inequality for Jensen's discrete inequality established in [1] for ...
Bounds for the logarithmic function are studied. In particular, we establish bounds with rational f...
In this paper, we present the concept of the logical entropy of order m, logical mutual information,...
A new analytic inequality for logarithms which provides a converse to arithmetic mean-geometric mean...
In this paper we point out a converse result of the celebrated Jensen inequality for differentiable ...
AbstractIn this paper, we derive some upper bounds for the relative entropy D(p ‖ q) of two probabil...
In this paper we derive some upper bounds for the relative entropy D(p || q) of two probability dist...
We introduce the notion of an interpolating path on the set of probability measures on finite graphs...
AbstractA new analytic inequality for logarithms which provides a converse to arithmetic meangeometr...
Using an inequality for convex functions by Andrica and Ra°a [1] (2.1), we point out a new inequalit...
AbstractUsing an inequality for convex functions by Andrica and Ra°a [1] (2.1), we point out a new i...
In this paper we discuss new inequalities for logarithmic mapping and apply them in Information Theo...
Using the concavity property of the log mapping and the weighted arithmetic mean - geometric mean in...
New inequalities for convex mappings of a real variable and applications in Information Theory for S...
We show that an information-theoretic property of Shannon's entropy power, known as concavity of ent...
By the use of a counterpart inequality for Jensen's discrete inequality established in [1] for ...
Bounds for the logarithmic function are studied. In particular, we establish bounds with rational f...
In this paper, we present the concept of the logical entropy of order m, logical mutual information,...
A new analytic inequality for logarithms which provides a converse to arithmetic mean-geometric mean...
In this paper we point out a converse result of the celebrated Jensen inequality for differentiable ...
AbstractIn this paper, we derive some upper bounds for the relative entropy D(p ‖ q) of two probabil...
In this paper we derive some upper bounds for the relative entropy D(p || q) of two probability dist...
We introduce the notion of an interpolating path on the set of probability measures on finite graphs...
AbstractA new analytic inequality for logarithms which provides a converse to arithmetic meangeometr...
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