AbstractIn this short note, the authors give a proof of a certain geometric inequality conjecture of Shan-He Wu by making use of some analytical techniques (see Srivastava et al. (2011) [5] and Wu et al. (2010) [6]). Finally, three closely-related geometric inequality problems are posed as open problems
Abstract. In this paper, using Bottema's inequality for two trian-gles and other results, the g...
In this note the author gives an alternative proof for a geometric inequalities obtained by M. Crasm...
We consider certain refinements of the arithmetic and geometric means. The results generalize an ine...
Copyright © 2013 Bo-Yan Xi. This is an open access article distributed under the Creative Commons At...
By applying techniques in the theory of convex functions and Schur-geometrically convex functions, t...
In practice, in the process of solving mathematical problems, we are faced with many professions rel...
In this paper, the open problem published in ([1]: Feng Qi, An algebraic inequality, J. Inequal. Pu...
This book presents the recent developments in the field of geometric inequalities and their applicat...
In 1977 Wu Wen-tsiin discovered an efficient method for mechanical theorem proving. This method has ...
The triangle inequality is basic for many results in real and complex analysis. The geometric form s...
The goal of this short note is the presentation of an elementary proof of the well-known inequality ...
In the previous two parts of this series, we studied the AM-GM inequality for two numbers in some d...
This article is the second in the ‘Inequalities’ series. We prove a very important inequality, the...
The Cauchy-Schwarz inequality is one of the most fundamental inequalities in the world of mathematic...
This book discusses about the basic topics on inequalities and their applications. These include the...
Abstract. In this paper, using Bottema's inequality for two trian-gles and other results, the g...
In this note the author gives an alternative proof for a geometric inequalities obtained by M. Crasm...
We consider certain refinements of the arithmetic and geometric means. The results generalize an ine...
Copyright © 2013 Bo-Yan Xi. This is an open access article distributed under the Creative Commons At...
By applying techniques in the theory of convex functions and Schur-geometrically convex functions, t...
In practice, in the process of solving mathematical problems, we are faced with many professions rel...
In this paper, the open problem published in ([1]: Feng Qi, An algebraic inequality, J. Inequal. Pu...
This book presents the recent developments in the field of geometric inequalities and their applicat...
In 1977 Wu Wen-tsiin discovered an efficient method for mechanical theorem proving. This method has ...
The triangle inequality is basic for many results in real and complex analysis. The geometric form s...
The goal of this short note is the presentation of an elementary proof of the well-known inequality ...
In the previous two parts of this series, we studied the AM-GM inequality for two numbers in some d...
This article is the second in the ‘Inequalities’ series. We prove a very important inequality, the...
The Cauchy-Schwarz inequality is one of the most fundamental inequalities in the world of mathematic...
This book discusses about the basic topics on inequalities and their applications. These include the...
Abstract. In this paper, using Bottema's inequality for two trian-gles and other results, the g...
In this note the author gives an alternative proof for a geometric inequalities obtained by M. Crasm...
We consider certain refinements of the arithmetic and geometric means. The results generalize an ine...
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