Sextic variety as Galois closure variety of smooth cubic
Abstract
Let V be a nonsingular projective algebraic variety of dimension n. Suppose there exists a very ample divisor D such that Dn=6 and dim H0(V, O(D))=n+3. Then, (V, D) defines a D6-Galois embedding if and only if it is a Galois closure variety of a smooth cubic in Pn+1 with respect to a suitable projection center such that the pull back of hyperplane of Pn is linearly equivalent to D.
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