On the biregular geometry of the Fulton-MacPherson compactification

Abstract

Let X[n] be the Fulton-MacPherson compactification of the configuration space of n ordered points on a smooth projective variety X. We prove that if either n≠ 2 or (X)≥ 2, then the connected component of the identity of Aut(X[n]) is isomorphic to the connected component of the identity of Aut(X). When X = C is a curve of genus g(C)≠ 1 we classify the dominant morphisms C[n]→ C[r], and thanks to this we manage to compute the whole automorphism group of C[n], namely Aut(C[n]) Sn× Aut(C) for any n≠ 2, while Aut(C[2]) S2 (Aut(C)× Aut(C)). Furthermore, we extend these results on the automorphisms to the case where X = C1× ... × Cr is a product of curves of genus g(Ci)≥ 2. Finally, using the techniques developed to deal with Fulton-MacPherson spaces, we study the automorphism groups of some Kontsevich moduli spaces M0,n(PN,d).