On the closure in $\overline M_g$ of smooth curves having a special Weierstrass point

Abstract: Let wt2 be the closure in M g , the coarse moduli space of stable complex curves of genus g ! 3, of the locus in M g of curves possessing a Weierstrass point of weight at least 2. The class of wt2 in the group PicM g Q is computed. The computation heavily relies on the notion of`d erivative'' of a relative Wronskian, introduced in [15] for families of smooth curves and here extended to suitable families of Deligne-Mumford stable curves. Such a computation provides, as a byproduct, a simpler proof of the main r… Show more

“…If C were singular the right-hand side of (1) would not be locally free. But for locally complete intersection curves, one may use the locally free substitutes of the principal parts, constructed via a ''paste and glue'' procedure in [8,9], used in [12] and more elegantly described, in an intrinsic way, by Laksov and Thorup in [15].…”

Jets of line bundles on curves and Wronskians

“…If C were singular the right-hand side of (1) would not be locally free. But for locally complete intersection curves, one may use the locally free substitutes of the principal parts, constructed via a ''paste and glue'' procedure in [8,9], used in [12] and more elegantly described, in an intrinsic way, by Laksov and Thorup in [15].…”

Jets of line bundles on curves and Wronskians

“…In this direction, there are two remarkable classical works by E. Arbarello, namely [Arba74,Arba78], where are studied the subloci W n,g ⊂ M g of curves admitting a Weierstrass point of weight not smaller than n. Among many others beautiful and high standing works describing cycles coming from Weierstrass points, for instance the remarkable [Di85], we would like to cite a particular one due to L. Gatto, c.f. [Ga01]. In this work, Gatto computes the class in the Picard group Pic(M g ) ⊗ Q of the locus of curves admitting a Weierstrass point of weight at least 2.…”

Local Complete Intersections and Weierstrass Points

“…To do this, we make the substitutions X i → t i and solve a homogeneous linear system with 60 equations. We can solve it in way that the solution depends only on the 15 coefficients: Therefore the compactified moduli space M S 6,1 can be realized as a closed subset of the 14-dimensional weighted projective space P(T 1,− k[S]|k ) ∼ = P 14 α , where α = (2,3,4,4,5,5,6,6,7,8,8,9,10,11,12). Since the odd symmetric semigroup S is negatively graded, cf.…”

“…Stoehr's techniques avoid suitable classes of symmetric semigroups, more precisely, it is assumed that the multiplicity n 1 of S satisfies 3 < n 1 < g, and that S = 4, 5 , avoiding the general points of H hyp 2g−2 and of H odd 2g−2 of the Kontsevich-Zorich space H 2g−2 . Another successful approach to study families of Weierstrass points can be done by considering (generalized) Wronskians and its derivatives, we refer to [12,13].…”

On the locus of curves with an odd subcanonical marked point