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  Volume 3, Issue 2, Article 21
 
Integral Inequalities of the Ostrowski Type
    Authors: Anthony Sofo,  
    Keywords: Ostrowski Integral Inequality, Quadrature Formulae  
    Date Received: 15/12/00  
    Date Accepted: 16/11/01  
    Subject Codes:

26D15,41A55.

  
    Editors: Terry M. Mills,  
 
    Abstract:

Integral inequalities of Ostrowski type are developed for $ n-$times differentiable mappings, with multiple branches, on the $ L_{infty }$ norm. Some particular inequalities are also investigated, which include explicit bounds for perturbed trapezoid, midpoint, Simpson's, Newton-Cotes and left and right rectangle rules. The results obtained provide sharper bounds than those obtained by Dragomir [5] and Cerone, Dragomir and Roumeliotis [2].

 

[2] P. CERONE, S.S. DRAGOMIR and J. ROUMELIOTIS, An inequality of Ostrowski type for mappings whose second derivatives are bounded and applications, East Asian J. of Math., 15(1) (1999), 1-9.
[5]  S.S. DRAGOMIR, A generalization of Ostrowski's integral inequality for mappings whose derivatives belong to $ L_{infty }$[a, b] and applications in numerical integration, SUT. J. of Math., (in press)

         
       
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