The Chow Ring Classes of PGL3 Orbit Closures in G(1, 5)
Abstract
The space of all pencils of conics in the plane P V (where V = 3) is a projective Grassmannian G (1, P Sym2 V*) and admits a natural PGL(V) action. It is a classical theorem that this action has exactly eight orbits, and in fact that the orbit of a pencil ⊂ P Sym2 V* is determined completely by its position with respect to the Veronese surface X ⊂ P Sym2V* of rank 1 conics and its secant variety S(X) ⊂ P Sym2 V*, which is the cubic fourfold of rank 2 conics. In this paper, we present some geometric descriptions of these orbits. Then, using a mixture of direct enumerative techniques and some Chern class computations, we present a calculation of the classes of the orbit closures in the Chow ring of this Grassmannian (and consequently also of their degrees under the Pl\"ucker embedding G (1, P Sym2 V*) P 2 Sym2 V*).
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