Genuinely ramified maps and monodromy
Abstract
For any genuinely ramified morphism f\, :\, Y\, \, X between irreducible smooth projective curves we prove that (Y×X Y) is connected, where \, ⊂\, Y×X Y is the diagonal. Using this result the following are proved: If f is further Morse then the Galois closure is the symmetric group Sd, where d\,=\, degree(f). The Galois group of the general projection, to a line, of any smooth curve X\,⊂\, n of degree d, which is not contained in a hyperplane and contains a non-flex point, is Sd.
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