The symmetric square of a curve and the Petri map
arXiv:1106.3190
Abstract
Let $\M_g$ be the course moduli space of complex projective nonsingular curves of genus $g$. We prove that when the Brill-Noether number $Ï(g,1,n)$ is non-negative the Petri locus $P^1_{g,n}\subset \M_g$ has a divisorial component whose closure has a non-empty intersection with $Î_0$. In order to prove the result we show that the scheme $G^1_n(Î)$ that parametrizes degree $n$ pencils on a curve $Î$ is isomorphic to a component of the Hilbert scheme parametrizing certain curves on the symmetric square $Î_2$ of $Î$ and we study the properties of such a family of curves.