Add to ORKGWe extend the result in part I ( Int. J. Math. Math. Sci., 2003(2003), 2061-2068;\ud MR1990724 (2004f:26027) ) of certain inequalities among the generalized power means
We give an elementary proof for an inequality involving the generalized elementary symmetric means
For 1<r<+∞, we find the least value α and the greatest value β such that the inequality Hα(a,b)0 wit...
AbstractConverses of matrix inequalities corresponding to ratios and differences of means are extend...
We extend the results in parts I, II on certain inequalities involving the generalized power means
We extend the results in part I, II on certain inequalities involving the generalized power means
In this paper, we extend the results in part I-III on certain inequalities involving the\ud weighted...
We extend the results in parts I, II on certain inequalities involving the generalized powe
We consider certain refinements of the arithmetic and geometric means, the results generalize an ine...
We consider certain refinements of the arithmetic and geometric means. The re-sults generalize an in...
We extend the results in parts I–III on certain inequalities involving the weighted power means as w...
AbstractIn this paper we gave a generalization of power means which include positive nonlinear funct...
We consider certain refinements of the arithmetic and geometric means. The results generalize an ine...
In this short note, a conjecture ([4]: J. K. Merikoski, Extending means of two variables to several...
We present three inequalities involving the power mean Mp(a, b) =( ap 2 + bp 2)1/p of order p (p = ...
In this paper the inequalities (1) are established. 2000 Mathematical Subject Classification: 26D20 ...
We give an elementary proof for an inequality involving the generalized elementary symmetric means
For 1<r<+∞, we find the least value α and the greatest value β such that the inequality Hα(a,b)0 wit...
AbstractConverses of matrix inequalities corresponding to ratios and differences of means are extend...
We extend the results in parts I, II on certain inequalities involving the generalized power means
We extend the results in part I, II on certain inequalities involving the generalized power means
In this paper, we extend the results in part I-III on certain inequalities involving the\ud weighted...
We extend the results in parts I, II on certain inequalities involving the generalized powe
We consider certain refinements of the arithmetic and geometric means, the results generalize an ine...
We consider certain refinements of the arithmetic and geometric means. The re-sults generalize an in...
We extend the results in parts I–III on certain inequalities involving the weighted power means as w...
AbstractIn this paper we gave a generalization of power means which include positive nonlinear funct...
We consider certain refinements of the arithmetic and geometric means. The results generalize an ine...
In this short note, a conjecture ([4]: J. K. Merikoski, Extending means of two variables to several...
We present three inequalities involving the power mean Mp(a, b) =( ap 2 + bp 2)1/p of order p (p = ...
In this paper the inequalities (1) are established. 2000 Mathematical Subject Classification: 26D20 ...
We give an elementary proof for an inequality involving the generalized elementary symmetric means
For 1<r<+∞, we find the least value α and the greatest value β such that the inequality Hα(a,b)0 wit...
AbstractConverses of matrix inequalities corresponding to ratios and differences of means are extend...