Hodge groups of certain superelliptic jacobians

Abstract

Suppose that K is a field of characteristic 0, p is an odd prime, r a positive integer, q=pr a prime power. Suppose that f(x) is a polynomial of degree n > 4 with coefficients in K and without multiple roots. Let us consider the superelliptic curve C: yq=f(x) and its jacobian J(C). Assuming that K is a subfield of the field of complex numbers, we study the (connected reductive algebraic) Hodge group Hdg of the corresponding complex abelian variety J(C). In our previous paper (arXiv:0907.1563 [math.AG]) we studied the center of Hdg. In this paper we study the semisimple part (commutator subgroup) of Hdg. Assuming that p does not divide n and n-1 is not divisible by q, the Galois group of f(x) over K is either the full symmetric group Sn or the alternating group An, we prove that the semisimple part of Hdg$ is "as large as possible".