Estimates for approximately Jensen convex functions
Abstract
In this paper functions f:D satisfying the inequality \[ f(x+y2)≤12f(x)+12f(y) +(x-y2) (x,y∈ D) \] are studied, where D is a nonempty convex subset of a real linear space X and :\12(x-y) : x,y ∈ D\ is a so-called error function. In this situation f is said to be -Jensen convex. The main results show that for all -Jensen convex function f:D, for all rational λ∈[0,1] and x,y∈ D, the following inequality holds \[ f(λ x+(1-λ)y) ≤ λ f(x)+(1-λ)f(y)+Σk=0∞ 12k(dist(2kλ,Z)·(x-y)). \] The infinite series on the right hand side is always convergent, moreover, for all rational λ∈[0,1], it can be evaluated as a finite sum.
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