Inequalities for means in two variables

Sharp two-parameter bounds for the identric mean ⋮ New sharp bounds for logarithmic mean and identric mean ⋮ Topics in Special Functions III ⋮ Optimal combinations bounds of root-square and arithmetic means for Toader mean ⋮ Best possible bounds for Neuman-Sándor mean by the identric, quadratic and contraharmonic means ⋮ Optimal generalized Heronian mean bounds for the logarithmic mean ⋮ Sharp bounds by the power mean for the generalized Heronian mean ⋮ Optimal bounds for the first Seiffert mean in terms of the convex combination of the logarithmic and Neuman-Sándor mean ⋮ Two optimal double inequalities between power mean and logarithmic mean ⋮ An optimal double inequality for means ⋮ Proof of one optimal inequality for generalized logarithmic, arithmetic, and geometric means ⋮ New inequalities for hyperbolic functions and their applications ⋮ On an inequality of Diananda. III. ⋮ Optimal bounds for Neuman-Sándor mean in terms of the convex combinations of harmonic, geometric, quadratic, and contraharmonic means ⋮ Inequalities between power means and convex combinations of the harmonic and logarithmic means ⋮ Optimal evaluation of a Toader-type mean by power mean ⋮ An optimal double inequality between geometric and identric means ⋮ Bounds of the Neuman-Sándor mean using power and identric means ⋮ A best possible double inequality for power mean ⋮ Optimal inequalities for power means ⋮ Sharp bounds by the generalized logarithmic mean for the geometric weighted mean of the geometric and harmonic means ⋮ A sharp double inequality between harmonic and identric means ⋮ Sharp power mean bounds for the combination of Seiffert and geometric means ⋮ Sharp power mean bounds for Seiffert mean ⋮ Optimal Lehmer mean bounds for the combinations of identric and logarithmic means ⋮ Inequalities for differences of power means in two variables ⋮ Sharp inequalities for trigonometric functions ⋮ Inequalities between arithmetic-geometric, Gini, and Toader means ⋮ Jordan type inequalities for hyperbolic functions and their applications ⋮ Sharp power mean bounds for the one-parameter harmonic mean ⋮ Two sharp inequalities for power mean, geometric mean, and harmonic mean ⋮ Some comparison inequalities for generalized Muirhead and identric means ⋮ Optimal inequalities for generalized logarithmic, arithmetic, and geometric means ⋮ Optimal power mean bounds for the weighted geometric mean of classical means ⋮ Optimal inequalities among various means of two arguments ⋮ Best possible inequalities between generalized logarithmic mean and classical means ⋮ Optimal lower power mean bound for the convex combination of harmonic and logarithmic means ⋮ The optimal upper and lower power mean bounds for a convex combination of the arithmetic and logarithmic means ⋮ ON TWO NEW MEANS OF TWO ARGUMENTS III ⋮ ON THE GENERALIZED CONVEXITY AND CONCAVITY ⋮ Convexity according to a pair of quasi-arithmetic means and inequalities ⋮ Sharp inequalities of Mitrinovic-Adamovic type ⋮ Improvements of bounds for the Sándor-Yang means ⋮ Sharp power mean bounds for Sándor mean ⋮ An unity of Mitrinovic-Adamovic and Cusa-Huygens inequalities and the analogue for hyperbolic functions ⋮ Logarithmic mean inequality for generalized trigonometric and hyperbolic functions ⋮ Optimal power mean bounds for Yang mean