Revisiting Ostrowski's Inequality

Abstract

The main objective of this paper is to present Ostrowski's inequality for a broader class of functions and to propose a refinement to the classical version of it. The original Ostrowski's inequality can be stated as follows "If f:[a,b] is differentiable and f'∈ L∞[a, b], then for any p∈\,]a,b[\,, the following functional inequality holds: equation* |f(p)-1b-a∫abf(t)\,dt|≤ (p-a)2+(b-p)22(b-a)\| f'\|ab\,.\,^^" equation* We relax the condition of differentiability and show that even if f∈ C[a,b] is non-differentiable at the points p_1,·s,p_n, then for any p∈\,]a,b[\,ni=1\p_i\, the following Ostrowski-type inequality holds: align* | f(p) - 1b-a ∫ab f(t)\,dt | ≤ 12 \ & \| f' \|ap1(p1 - a),\,…,\, \| f' \|pi-1p (p - pi-1),\, \| f' \|ppi (pi - p),\, \\ & …,\, \| f' \|pnb (b - pn) \ + \ f(a) + Σi=1n f(pi),\, -Σi=1n f(pi) - f(b) \. align* Also, we investigate the possibility of proposing a refinement for Ostrowski inequality. We prove that if f'∈ L∞[a, b], then for any p∈\,]a,b[, we can restructure the inequality as follows: align* | f(p) - 1b-a ∫ab f(t)\,dt | ≤ \ & [ 14 + ( p - a + b2b - a )2 ](b - a) \| f' \|ab, \\ & + 12 \ (p - a) \| f' \|ap,\, (b - p) \| f' \|pb \ \. align*