The moduli space of cactus flower curves and the virtual cactus group

Abstract

The space n = n/ of n points on the line modulo translation has a natural compactification n as a matroid Schubert variety. In this space, pairwise distances between points can be infinite; it is natural to imagine points at infinite distance from each other as living on different projective lines. We call such a configuration of points a ``flower curve'', since we picture the projective lines joined into a flower. Within n , we have the space Fn = n / of n distinct points. We introduce a natural compatification Fn along with a map Fn → n , whose fibres are products of genus 0 Deligne-Mumford spaces. We show that both n and Fn, are special fibers of 1-parameter families whose generic fibers are, respectively, Losev-Manin and Deligne-Mumford moduli spaces of stable genus 0 curves with n+2 marked points. We find combinatorial models for the real loci n() and Fn() . Using these models, we prove that these spaces are aspherical and that their equivariant fundamental groups are the virtual symmetric group and the virtual cactus groups, respectively. The degeneration of a twisted real form of the Deligne-Mumford space to Fn(R) gives rise to a natural homomorphism from the affine cactus group to the virtual cactus group.