Generalization of cyclic refinements of Jensen’s inequality by Fink’s identity
نویسندگان
چکیده
We generalize cyclic refinements of Jensen’s inequality from a convex function to a higher-order convex function by means of Lagrange–Green’s function and Fink’s identity. We formulate the monotonicity of the linear functionals obtained from these identities utilizing the theory of inequalities for n-convex functions at a point. New Grüssand Ostrowski-type bounds are found for identities associated with the obtained inequalities. Finally, we investigate the properties of linear functionals regarding exponential convexity and mean value theorems.
منابع مشابه
On generalization of refinement of Jensen’s inequality using Fink’s identity and Abel-Gontscharoff Green function
In this paper, we formulate new Abel-Gontscharoff type identities involving new Green functions for the 'two-point right focal' problem. We use Fink's identity and a new Abel-Gontscharoff-type Green's function for a 'two-point right focal' to generalize the refinement of Jensen's inequality given in (Horváth and Pečarić in Math. Inequal. Appl. 14: 777-791, 2011) from convex function to higher o...
متن کاملOne Refinement of Jensen’s Discrete Inequality and Applications
Jensen’s inequality induces different forms of functionals which enables refinements for many classic inequalities ([5]). Several refinements of Jensen’s inequalities were given in [4]. In this paper we refine Jensen’s inequality by separating a discrete domain of it. At the end, we give some applications. Mathematics subject classification (2000): 26D15.
متن کاملRefinements and generalizations of some inequalities of Shafer-Fink’s type for the inverse sine function
In this paper, we give some sharper refinements and generalizations of inequalities related to Shafer-Fink's inequality for the inverse sine function stated in Theorems 1, 2, and 3 of Bercu (Math. Probl. Eng. 2017: Article ID 9237932, 2017).
متن کاملSome Refinements of Discrete Jensen’s Inequality and Some of Its Applications
Jensen’s inequality is sometimes called the king of inequalities [4] because it implies at once the main part of the other classical inequalities (e.g. those by Hölder, Minkowski, Young, and the AGM inequality, etc.). Therefore, it is worth studying it thoroughly and refine it from different points of view. There are numerous refinements of Jensen’s inequality, see e.g. [3-5] and the references...
متن کاملSharpening and Generalizations of Shafer-fink’s Double Inequality for the Arc Sine Function
In this paper, we sharpen and generalize Shafer-Fink’s double inequality for the arc sine function.
متن کامل