Add to ORKGIn this paper, we study the AA, GG, AG and GA convexities\ud of homogeneous functions of two variables, of which simplified\ud decision methods are presented. As applications, new simple proofs of\ud H–type, Ch–type and M–type inequalities for homogeneous means or\ud functions are given
There is a strong correlation between convexity and symmetry concepts. In this study, we investigate...
In the paper, the authors, by Hölder's inequality, establish some Hermite-Hadamard type integral ine...
Jensen's inequality for concave functions J J (f) du < j (ff dt) (1) or for convex functions i...
In this paper, we study the AA-convexity and GG-convexity\ud of Stolarsky means, of which Hölder, Ch...
In this paper, we study the AA-convexity and GG-convexity of Stolarsky means, of which Hölder, Cheb...
In the paper, I introduce the definition of the (m,h1,h2)–HA-convex functions, present some properti...
AbstractLet R+=(0,∞) and let M be the family of all mean values of two numbers in R+ (some examples ...
AbstractWe study Minkowski's inequality[formula] (I⊆R is an interval) and its reverse for the means[...
[[abstract]]In this paper, we defined and studied the monotonicity of homogeneous function of the ty...
In this article we establish new tight multivariate Chebyshev-Griiss and Comparison of Integral mean...
In the paper, the authors introduce definitions of the $ (h_1,h_2) $-GA-convex functions and the $ (...
In this paper, we establish some Hermite–Hadamard-typeinequalities for convexfunctions and give seve...
In this paper, we establish some Hermite–Hadamard-typeinequalities for convexfunctions and give seve...
Inequalities lie at the heart of a great deal of mathematics.G. H. Hardy reported Harald Bohr as say...
Copyright c © 2014 Khan, Pečaric ́ and Perić. This is an open access article distributed under the...
There is a strong correlation between convexity and symmetry concepts. In this study, we investigate...
In the paper, the authors, by Hölder's inequality, establish some Hermite-Hadamard type integral ine...
Jensen's inequality for concave functions J J (f) du < j (ff dt) (1) or for convex functions i...
In this paper, we study the AA-convexity and GG-convexity\ud of Stolarsky means, of which Hölder, Ch...
In this paper, we study the AA-convexity and GG-convexity of Stolarsky means, of which Hölder, Cheb...
In the paper, I introduce the definition of the (m,h1,h2)–HA-convex functions, present some properti...
AbstractLet R+=(0,∞) and let M be the family of all mean values of two numbers in R+ (some examples ...
AbstractWe study Minkowski's inequality[formula] (I⊆R is an interval) and its reverse for the means[...
[[abstract]]In this paper, we defined and studied the monotonicity of homogeneous function of the ty...
In this article we establish new tight multivariate Chebyshev-Griiss and Comparison of Integral mean...
In the paper, the authors introduce definitions of the $ (h_1,h_2) $-GA-convex functions and the $ (...
In this paper, we establish some Hermite–Hadamard-typeinequalities for convexfunctions and give seve...
In this paper, we establish some Hermite–Hadamard-typeinequalities for convexfunctions and give seve...
Inequalities lie at the heart of a great deal of mathematics.G. H. Hardy reported Harald Bohr as say...
Copyright c © 2014 Khan, Pečaric ́ and Perić. This is an open access article distributed under the...
There is a strong correlation between convexity and symmetry concepts. In this study, we investigate...
In the paper, the authors, by Hölder's inequality, establish some Hermite-Hadamard type integral ine...
Jensen's inequality for concave functions J J (f) du < j (ff dt) (1) or for convex functions i...