The Hesse Pencil Variety

Abstract

We introduce and study the Hesse pencil variety H8, obtained as the Zariski closure in the Grassmannian G(1,9) of the set of pencils generated by a smooth plane cubic and its Hessian. We prove that H8 has dimension 8 and can be realized as the intersection of G(1,9) with ten hyperplanes corresponding to the Schur module S(5,1)C3. Moreover, H8 coincides with the closure of the SL(3)-orbit of the pencil x3+y3+z3,\ xyz and contains eight additional orbits. The variety is singular, and its singular locus is precisely the union of two orbits, O( x3,x2y) and O( x2y,x2z). A key ingredient in our study is a cubic skew-invariant R∈ 3(Sym3C3) defined by R(l3,m3,n3)=(l m n)3, whose vanishing characterizes pencils generated by a cubic and its Hessian. This invariant allows us to write explicit equations defining H8. A crucial geometric step in our argument is the fact that through four general points of P2 there pass exactly six Hesse configurations, which enables us to compute the multidegree of H8 and conclude that it coincides with the variety defined by the invariant R.

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