Stability of hypersurface sections of quadric threefolds
Abstract
Let S be a complete intersection of a smooth quadric 3-fold Q and a hypersurface of degree d in P4. In this paper we analyze GIT stability of S with respect to the natural G=SO(5, C)-action. We prove that if d 4 and S has at worst semi-log canonical singularities then S is G-stable. Also, we prove that if d 3 and S has at worst semi-log canonical singularities then S is G-semistable.
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