The endomorphism rings of jacobians of cyclic covers of the projective line
Abstract
Suppose K is a field of characteristic 0, Ka is its algebraic closure, p is an odd prime. Suppose, f(x) ∈ K[x] is a polynomial of degree n 5 without multiple roots. Let us consider a curve C: yp=f(x) and its jacobian J(C). It is known that the ring End(J(C)) of all Ka-endomorphisms of J(C) contains the ring Z[ζp] of integers in the pth cyclotomic field (generated by obvious automorphisms of C). We prove that End(J(C))=Z[ζp] if the Galois group of f over K is either the symmetric group Sn or the alternating group An.
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