Extensions of Vietoris’s inequalities I

## Abstract Let equation image where equation image In 1958, Vietoris proved that __σ~n~__ (__x__) is positive for all __n__ ≥ 1 and __x__ ∈ (0, __π__). We establish the following refinement. The inequalities equation image hold for all natural numbers __n__ and real numbers __n__ ≥ 1 and __x

We offer a new proof of the well-known Steffensen Inequality, whose context is sufficiently general that it engenders a number of extensions.

An extension of Carlson's inequality is made by using the Euler-Maclaurin summation formula. The integral analogues of this inequality are also presented.  2002 Elsevier Science (USA)

## An upper bound for P[W=O], where W is a sum of indicator variables with a special structure, which appears, for example, in subgraph counts in random graphs, is derived. Furthermore, its applications to a problem of k-runs and a random graph problem are given. The result is a generalization and