English

Pointed trees of projective spaces

Algebraic Geometry 2007-05-23 v3

Abstract

We introduce a smooth projective variety Td,nT_{d,n} which compactifies the space of configurations of nn distinct points on affine dd-space modulo translation and homothety. The points in the boundary correspond to nn-pointed stable rooted trees of dd-dimensional projective spaces, which for d=1d = 1, are (n+1)(n+1)-pointed stable rational curves. In particular, T1,nT_{1,n} is isomorphic to Mˉ0,n+1\bar{M}_{0,n+1}, the moduli space of such curves. The variety Td,nT_{d,n} shares many properties with Mˉ0,n\bar{M}_{0,n}. For example, as we prove, the boundary is a smooth normal crossings divisor whose components are products of Td,iT_{d,i} for i<ni < n, it has an inductive construction analogous to but differing from Keel's for Mˉ0,n\bar{M}_{0,n} which can be used to describe its Chow groups, Chow motive and Poincar\'e polynomials, generalizing \cite{Keel,Man:GF}. We give a presentation of the Chow rings of Td,nT_{d,n}, exhibit explicit dual bases for the dimension 1 and codimension 1 cycles. The variety Td,nT_{d,n} is embedded in the Fulton-MacPherson spaces X[n]X[n] for \textit{any} smooth variety XX and we use this connection in a number of ways. For example, to give a family of ample divisors on Td,nT_{d,n} and to give an inductive presentation of the Chow groups and the Chow motive of X[n]X[n] analogous to Keel's presentation for Mˉ0,n\bar{M}_{0,n}, solving a problem posed by Fulton and MacPherson.

Keywords

Cite

@article{arxiv.math/0505296,
  title  = {Pointed trees of projective spaces},
  author = {Linda Chen and Angela Gibney and Daniel Krashen},
  journal= {arXiv preprint arXiv:math/0505296},
  year   = {2007}
}

Comments

33 pages, minor corrections made