Galois subspaces for compact Riemann surfaces of genus 2
Abstract
Let X be a compact Riemann surface of genus 2 and D a very ample divisor with φD its associated embedding into Pn. We consider the set GX,D of linear subspaces W of Pn of codimension 2 with projection πW such that fW = πW φD is Galois, i.e. fW*k(P1) ⊂eq k(X) is a Galois extension. It is known that GX,D is isomorphic to a disjoint union of projective spaces. In this article, we calculate the dimension of projective spaces in the decomposition of GX,D, when D is induced by a subgroup of Aut(X).
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