Variety of apolar schemes to powers of quadrics
Abstract
We study the variety VAPSG(q23, 10) (resp. VAPSG(q32, 10)), a Grassmannian compactification of the variety of finite schemes of length 10 apolar to q23 (resp. q32), where \qn = 0\⊂ Pn is a smooth quadric hypersurface. In particular, we show that VAPSG(q23, 10) is the tangent developable of a rational normal curve, while VAPSG(q32, 10) is reducible with three singular 5-dimensional components.
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