Generalized double-integral Ostrowski type inequalities on time scales

A time scale version of Ostrowski's inequality is given as follows: Let f, g ∈ C r d ([a, b], R) be two linearly independent functions, then for any α ∈ [-1, 1] and any arbitrary

In this paper, using the comparison theorem, we investigate some Pachpatte type integral inequalities on time scales, which provide explicit bounds on unknown functions. Our results extend some known dynamic inequalities on time scales, unify and extend some continuous inequalities and their corresp

In this study, we establish some new weighted Iyengar type integral inequalities using Steffensen's inequality on time scales.

We consider a version of the double integral calculus of variations on time scales, which includes as special cases the classical two-variable calculus of variations and the discrete two-variable calculus of variations. Necessary and sufficient conditions for a local extremum are established, among

Some Ostrowski type inequalities are given for the Stieltjes integral where the integrand is absolutely continuous while the integrator is of bounded variation. The case when | f | is convex is explored. Applications for the mid-point rule and a generalised trapezoid type rule are also presented.

We establish two new inequalities of Grüss type involving functions of two independent variables. The analysis used in the proofs is elementary and our results provide new estimates on inequalities of this type.  2002 Elsevier Science (USA)