AbstractThe Schur-convexity at the upper and lower limits of the integral for the mean of a convex function is researched. As applications, a form with a parameter of Stolarsky’s mean is obtained and a relevant double inequality that is an extension of a known inequality is established
AbstractThe Schur-convexity and the Schur-geometric convexity with variables (x,y)∈R++2 for fixed (s...
Some new inequalities of Hermite-Hadamard type for GA-convex functions defined on positive intervals...
In this paper we prove a mean-value theorem for integral calculus, then we demonstrate properties of...
AbstractThe Schur-convexity at the upper and lower limits of the integral for the mean of a convex f...
AbstractThis paper is concerned with the generalized Hamy symmetric function∑n(x,r;f)=∑1⩽i1<i2<⋯<ir⩽...
In this paper, we discuss the Schur convexity, Schur geometrical convexity and Schur harmonic conv...
AbstractIn this paper, we establish two extensions of Weierstrass's inequality involving symmetric f...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
Abstract. Connections of an inequality of Klamkin with Stolarsky means and convexity are shown. An a...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
Title with symbols spelt out: Functions generating (mu, Mu, psi)-Schur-convex sum
In this paper we present some generalizations of the classical inequalities of Fejér for m-convex fu...
AbstractThe purpose of this paper is to deduce a Schur type inequality for five variables
AbstractThe Schur-convexity and the Schur-geometric convexity with variables (x,y)∈R++2 for fixed (s...
Some new inequalities of Hermite-Hadamard type for GA-convex functions defined on positive intervals...
In this paper we prove a mean-value theorem for integral calculus, then we demonstrate properties of...
AbstractThe Schur-convexity at the upper and lower limits of the integral for the mean of a convex f...
AbstractThis paper is concerned with the generalized Hamy symmetric function∑n(x,r;f)=∑1⩽i1<i2<⋯<ir⩽...
In this paper, we discuss the Schur convexity, Schur geometrical convexity and Schur harmonic conv...
AbstractIn this paper, we establish two extensions of Weierstrass's inequality involving symmetric f...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
Abstract. Connections of an inequality of Klamkin with Stolarsky means and convexity are shown. An a...
It is well known that the Hermite–Hadamard inequality (called the HH inequality) refines the definit...
Title with symbols spelt out: Functions generating (mu, Mu, psi)-Schur-convex sum
In this paper we present some generalizations of the classical inequalities of Fejér for m-convex fu...
AbstractThe purpose of this paper is to deduce a Schur type inequality for five variables
AbstractThe Schur-convexity and the Schur-geometric convexity with variables (x,y)∈R++2 for fixed (s...
Some new inequalities of Hermite-Hadamard type for GA-convex functions defined on positive intervals...
In this paper we prove a mean-value theorem for integral calculus, then we demonstrate properties of...
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