Stability of nets of quadrics in P5 and associated discriminants
Abstract
Let S be a complete intersection surface defined by a net of quadrics in P5. In this paper we analyze GIT stability of nets of quadrics in P5 up to projective equivalence, and discuss some connections between a net of quadrics and the associated discriminant sextic curve. In particular, we prove that if S is normal and the discriminant (S) of S is stable then is stable. And we prove that if S has the reduced discriminant and (S) is stable then is stable. Moreover, we prove that if S has simple singularities then (S) has simple singularities.
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