The p-rank of the reduction mod\, p of jacobians and Jacobi sums

Abstract

Let YK XK be a ramified cyclic covering of curves, where K is a cyclotomic field. In this work we study the p-rank of the reduction mod\, p of a model of the jacobian of YK. In this way, we obtain counterparts of the Deuring polynomial, defined for elliptic curves, for genus greater than one. Moreover, we show that curves YK give Hecke characters for cyclotomic fields. To carry out this study we use Jacobi sums and certain L-functions.