Abstract
In this paper we have considered an inequality having 11 divergence measures. Out of them three are logarithmic such as Jeffryes-Kullback-Leiber (4) (5) J-divergence. Burbea-Rao (1) Jensen-Shannon divergenceand Taneja (7) arithmetic-geometric mean divergence. The other three are non-logarithmic such as Hellinger discrimination, symmetric ´ 2 idivergence, and triangular discrimination. Three more are considered are due to mean divergences. Pranesh and Johnson (6) and Jain and Srivastava (3) studied different kind of divergence measures. We have considered measures arising due to differences of single inequality having 11 divergence measures in terms of a sequence. Based on these differences we have obtained many inequalities. These inequalities are kept as nested or sequential forms. Some reverse inequalities and equivalent versions are also studied.
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