Modular interpretation of a non-reductive Chow quotient

Abstract

The space of n distinct points and a disjoint parameterized hyperplane in projective d-space up to projectivity---equivalently, configurations of n distinct points in affine d-space up to translation and homothety---has a beautiful compactification introduced by Chen-Gibney-Krashen. This variety, constructed inductively using the apparatus of Fulton-MacPherson configuration spaces, is a parameter space of certain pointed rational varieties whose dual intersection complex is a rooted tree. This generalizes M0,n and shares many properties with it. In this paper, we prove that the normalization of the Chow quotient of (Pd)n by the diagonal action of the subgroup of projectivities fixing a hyperplane, pointwise, is isomorphic to this Chen-Gibney-Krashen space Td,n. This is a non-reductive analogue of Kapranov's famous quotient construction of M0,n, and indeed as a special case we show that M0,n is the Chow quotient of (P1)n-1 by an action of a semidirect product of the additive and multiplicative group.