On the (n+3)-webs by rational curves induced by the forgetful maps on the moduli spaces M0,n+3

Abstract

We discuss the curvilinear web W0,n+3 on the moduli space M0,n+3 of projective configurations of n+3 points on P1 defined by the n+3 forgetful maps M0,n+3→ M0,n+2. We recall classical results which show that this web is linearizable when n is odd, or is equivalent to a web by conics when n is even. We then turn to the abelian relations (ARs) of these webs. After recalling the well-known case when n=2 (related to the 5-terms functional identity of the dilogarithm), we focus on the case of the 6-web W0,6. We show that this web is isomorphic to the web formed by the lines contained in Segre's cubic primal S⊂ P4 and that a kind of `Abel's theorem' allows to describe the ARs of W0,6 by means of the abelian 2-forms on the Fano surface F1(S)⊂ G1( P4) of lines contained in S. We deduce from this that W0,6 has maximal rank with all its ARs rational, and that these span a space which is an irreducible S6-module. Then we take up an approach due to Damiano that we correct in the case when n is odd: it leads to an abstract description of the space of ARs of W0,n+3 as a Sn+3-representation. In particular, we obtain that this web has maximal rank for any n≥ 2. Finally, we consider `Euler's abelian relation En', a particular AR for W0,n+3 constructed by Damiano from a characteristic class on the grassmannian of 2-planes in Rn+3 by means of Gelfand-MacPherson theory of polylogarithmic forms. We give an explicit conjectural formula for the components of En that we prove to be correct for n≤ 12.