Gauss Sums and Binomial Coefficients

A counting argument is developed and divisibility properties of the binomial coefficients are combined to prove, among other results, that where K n , resp. K k n , is the complete, resp. complete k-uniform, hypergaph and R(K n , Z p ), R(K k n , Z 2 ) are the corresponding zero-sum Ramsey numbers.

## Abstract We consider the expression and investigate for which __k__ and __n__ is __P__(__k__, __n__) an integer. We find integer solutions __k__ and __m__ of the equation __P__(__k__, __n__) = __m__ for a given integer __m__ and approximate real solutions __x__ = __x__(__k__) of the equation __

In this paper, we give a new proof of the Iwasawa main conjecture using the Euler systems of Gauss sums. Our proof is different from that of Mazur and Wiles and that of Rubin and Greither. Rubin's proof used the Euler systems of cyclotomic units and the plus part of the ideal class groups. Instead o

We study quadratic residue difference sets, GMW difference sets, and difference sets arising from monomial hyperovals, all of which are (2 d &1, 2 d&1 &1, 2 d&2 &1) cyclic difference sets in the multiplicative group of the finite field F 2 d of 2 d elements, with d 2. We show that, except for a few