Inequalities for mean values in two variables (Q1704493)

This paper presents several new inequalities involving the classical arithmetic, geometric and power means as well as the Heinz means and its complementary in two independent variables \(x\) and \(y\). Several improvements of the arithmetic mean-geomentric mean inequality and their refinements are also derived and discussed. Furthermore, the monotonicity properties \(H_t (x,y)\) of the Heinz mean of \(x\) and \(y\) of order \(t\) and \(1/H^*_t (x,y)\) (where \(H^*_t (x,y)\) is the complementary Heinz mean of \(x\) and \(y\)) are also examined and it was shown that these monotonicity properties can be substantially extended.