Boundary of the moduli space of stable cubic fivefolds

Abstract

We study the GIT compactification P(Sym3C7)//SL(7) of the moduli space of cubic fivefolds X⊂P6 and give an explicit description of its strictly semistable boundary. We construct closed-orbit normal forms and show that the strictly semistable locus has exactly 21 irreducible components. For a general polystable member in each component we determine Sing(X): besides finitely many isolated points, the singular locus may contain a one-dimensional component which is a line, a smooth conic, a (2,2) complete-intersection curve, or an elliptic quartic. The isolated boundary singularities are quasi-homogeneous and fall into precisely six analytic types; we single them out as extremal cubic fivefold singularities. Using Park's framework relating minimal exponents to hypersurface GIT stability, we prove that each boundary component is characterized by the critical value α=(n+1)/d=7/3 for (n,d)=(6,3), both locally for the isolated extremal types and globally for a general member of the component. Finally, via Kirwan's stratification we compute the codimension-one wall-adjacency relation among the 21 components, obtaining an explicit graph with 21 vertices and 56 edges (in particular, with no isolated vertices).