Endomorphisms of ordinary superelliptic jacobians

Abstract

Let K be a field of prime characteristic p, n>4 an integer, f(x) an irreducible polynomial over K of degree n, whose Galois group is either the full symmetric group Sn or the alternating group An. Let l be an odd prime different from p, Z[ζl] the ring of integers in the lth cyclotomic field, Cf,l:yl=f(x) the corresponding superelliptic curve and J(Cf,l) its jacobian. We prove that the ring of all endomorphisms of J(Cf,l) coincides with Z[ζl] if J(Cf,l) is an ordinary abelian variety and (l,n) (5,5).