Improvement of some Ostrowski-Grüss type inequalities

Based on the Euler-Maclaurin formula in the spirit of [1], we provide a unified approach to some inequalities of Ostrowski-Griiss type, which include some existing results as special cases. Some illustrative examples are also included.

we prove an inequality of Griiss type and use it to improve strictly some general Euler-Griiss type inequalities.. All improved inequalities are sharp.

Applying the Griias inequali@ to the Euler type formulae we prove some Euler-G&atype inequalities.

A connection between Grüss inequality and the error of best approximation is revealed. A Grüss-type inequality that unifies the continuous and discrete versions of the classical Grüss inequalities is established.  2002 Elsevier Science (USA)

In this paper we derive some Grüss and Ostrowski-Grüss type inequalities for functions in L p -spaces. As applications, we provide some new estimates for the error in some numerical integration rules. In particular, we deal with the mid-point and trapezoid quadrature rules.