Point Configurations and Translations

Abstract

The spaces of point configurations on the projective line up to the action of SL(2, K) and its maximal torus are canonically compactified by the Grothdieck-Knudsen and Losev-Manin moduli spaces M0,n and Ln respectively. We examine the configuration space up to the action of the maximal unipotent group Ga⊂eq SL(2, K) and define an analogous compactification. For this we first assign a canonical quotient to the action of a unipotent group on a projective variety. Moreover, we show that similar to M0,n and Ln this quotient arises in a sequence of blow-ups from a product of projective spaces.