Schur-convexity and Schur-geometrically concavity of Gini means
Computers & Mathematics with Applications
Some results on generalized residual entropy
Information Sciences: an International Journal
Generalized Entropy Power Inequalities and Monotonicity Properties of Information
IEEE Transactions on Information Theory
Hi-index | 0.00 |
The information entropy has general applications in different subjects, such as information theory, linear algebra, signal processing, dynamical systems, ergodic theory, probability and statistical. Then the study of inequality on the information entropy has important signification in theory. Schur-convexity and Schur-geometric convexity and Schur-harmonic convexity entropy are studied for the generalized information based on the well-known Schur's condition. As applications, some inequalities of the entropy are established by use of majorization.