Configurations of points on a line up to scaling or translation

Abstract

We prove that the Losev--Manin compactification of the space of configurations of n points on P1 \0,∞\ modulo scaling degenerates (isotrivially) to a compactification of the space of configurations of n points on A1 modulo translation. The latter resembles the compactification constructed by Ziltener and Mau--Woodward, but allows the marked points to coincide, making it a Gan-1-variety, which mirrors the fact that the Losev--Manin space is toric. The degeneration is compatible with the actions of Gmn-1 and Gan-1 in the sense that these actions fit together globally in the total space of the degeneration.