Endomorphisms of superelliptic jacobians
Abstract
Let K be a field of characteristic zero, n>4 an integer, f(x) an irreducible polynomial over K of degree n, whose Galois group is doubly transitive simple non-abelian group. Let p be an odd prime, Z[ζp] the ring of integers in the p-th cyclotomic field, Cf,p:yp=f(x) the corresponding superelliptic curve and J(Cf,p) its jacobian. Assuming that either n=p+1 or p does not divide n(n-1), we prove that the ring of all endomorphisms of J(Cf,p) coincides with Z[ζp].
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