A bound for Wilson's theorem (II)

In this article we prove the following statement. For any positive integers k 2 3 and A, let &A) =exp{exp{k'\*}}. If Av(v -1) = 0 (mod k(k -I)) and A(v -1) = 0 (mod k -1) and v > c ( k , A), then a B(v, k , A) exists. o 1996 John Wiley & Sons, Inc. ## 1. Introduction A painvise balanced design (or

We obtain new characterizations of smoothness, saturation results, and existence theorems of derivatives for weighted polynomials associated with Erdo s weights on the real line. Our methods rely heavily on realization functionals.

The upper bound inequality h i (P)&h i&1 (P) ( n&d+i&2 i ) (0 i dÂ2) is proved for the toric h-vector of a rational convex d-dimensional polytope with n vertices. This gives nonlinear inequalities on flag vectors of rational polytopes. ## 1998 Academic Press A major result in polytope theory is th

A sharp lower bound is obtained for f Ј z in the class SSP of functions starlike with respect to symmetric points. As a consequence, some results are improved both for SSP and the class of uniformly starlike functions.