Sherman’s inequality and its converse for strongly convex functions withapplications to generalizedf-divergences

Abstract: Considering the weighted concept of majorization, Sherman obtained generalization of majorization inequality for convex functions known as Sherman's inequality. We extend Sherman's result to the class of n -strongly convex functions using extended idea of convexity to the class of strongly convex functions. We also obtain upper bound for Sherman's inequality, called the converse Sherman inequality, and as easy consequences we get Jensen's as well as majorization inequality and their conversions for strongly co… Show more

More Accurate Majorization Inequalities Obtained Via Superquadraticity and Convexity with Application to Entropies

More Accurate Majorization Inequalities Obtained Via Superquadraticity and Convexity with Application to Entropies

n-convexity and weighted majorization with applications to f-divergences and Zipf–Mandelbrot law

Improvements of Jensen's inequality and its converse for strongly convex functions with applications to strongly f-divergences