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Gavril Farkas 《Advances in Mathematics》2010,223(2):433-443
We determine the Kodaira dimension of the moduli space Sg of even spin curves for all g. Precisely, we show that Sg is of general type for g>8 and has negative Kodaira dimension for g<8. 相似文献
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Naoki Murabayashi 《manuscripta mathematica》1994,84(1):125-133
We consider the moduli spaceS
n
of curvesC of genus 2 with the property:C has a “maximal” mapf of degreen to an elliptic curveE. Here, the term “maximal” means that the mapf∶C→E doesn't factor over an unramified cover ofE. By Torelli mapS
n
is viewed as a subset of the moduli spaceA
2 of principally polarized abelian surfaces. On the other hand the Humbert surfaceH
Δ of invariant Δ is defined as a subvariety ofA
2(C), the set of C-valued points ofA
2. The purpose of this paper is to releaseS
n
withH
Δ. 相似文献
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We explicitly describe complete, one-dimensional subvarieties of the moduli space of smooth complex curves of genus 3.Supported by the Netherlands Organization for Scientific Research (N.W.O.). 相似文献
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Michela Artebani 《Transactions of the American Mathematical Society》2008,360(3):1581-1599
S. Kondo used periods of surfaces to prove that the moduli space of genus three curves is birational to an arithmetic quotient of a complex 6-ball. In this paper we study Heegner divisors in the ball quotient, given by arithmetically defined hyperplane sections of the ball. We show that the corresponding loci of genus three curves are given by hyperelliptic curves, singular plane quartics and plane quartics admitting certain rational ``splitting curves'.
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We give a new method for generating genus 2 curves over a finite field with a given number of points on the Jacobian of the curve. We define two new invariants for genus 2 curves as values of modular functions on the Hilbert moduli space and show how to compute them. We relate them to the usual three Igusa invariants on the Siegel moduli space and give an algorithm to construct curves using these new invariants. Our approach simplifies the complex analytic method for computing genus 2 curves for cryptography and reduces the amount of computation required. 相似文献
11.
Laura DeMarco 《Journal of the American Mathematical Society》2007,20(2):321-355
Let be the space of quadratic rational maps , modulo the action by conjugation of the group of Möbius transformations. In this paper a compactification of is defined, as a modification of Milnor's , by choosing representatives of a conjugacy class such that the measure of maximal entropy of has conformal barycenter at the origin in and taking the closure in the space of probability measures. It is shown that is the smallest compactification of such that all iterate maps extend continuously to , where is the natural compactification of coming from geometric invariant theory.
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Robin Hartshorne 《Annali dell'Universita di Ferrara》1994,40(1):207-223
LetC be a curve contained in ℙ
k
3
(k of any characteristic), which is locally Cohen-Macaulay, not contained in a plane and of degreed. We prove thatp
a
(C)≤≤((d−2)(d−3))/2. Moreover we show existence of curves with anyd, p
a
satisfying this inequality and we characterize those curves for which equality holds.
Sunto Si dimostra che seC⊃ℙ k 3 (k di caratteristica qualunque) é una curva, non piana, localmente Cohen-Macaulay, di gradod, allorap a (C)≤((d−2)(d−3))/2. Si mostra che questa limitazione è ottimale, e si classificano le curve di genere aritmetico massimale.相似文献
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Özgür Ceyhan 《Selecta Mathematica, New Series》2007,13(2):203-237
The moduli space parameterizes the isomorphism classes of S-pointed stable real curves of genus zero which are invariant under relabeling by the involution σ. This moduli space is stratified according to the degeneration types of σ-invariant curves. The degeneration types of σ-invariant curves are encoded by their dual trees with additional decorations. We construct a combinatorial graph complex
generated by the fundamental classes of strata of . We show that the homology of is isomorphic to the homology of our graph complex. We also give a presentation of the fundamental group of .
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15.
In this work we study the additive orbifold cohomology of the moduli stack of smooth genus g curves. We show that this problem reduces to investigating the rational cohomology of moduli spaces of cyclic covers of curves where the genus of the covering curve is g. Then we work out the case of genus g = 3. Furthermore, we determine the part of the orbifold cohomology of the Deligne–Mumford compactification of the moduli space of genus 3 curves that comes from the Zariski closure of the inertia stack of ${\mathcal{M}3}$ . 相似文献
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The Euler characteristic of the moduli space of curves 总被引:1,自引:0,他引:1
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Paul Larsen 《Geometriae Dedicata》2013,162(1):305-323
We study the Cox ring of the moduli space of stable pointed rational curves, ${\overline{M}_{0,n}}$ , via the closely related permutohedral (or Losev-Manin) spaces ${\overline{L}_{n-2}}$ . Our main result establishes $\left(\begin{array}{ll} n \\ 2 \end{array}\right)$ polynomial subrings of ${{\rm Cox}(\overline{M}_{0,n})}$ , thus giving collections of boundary variables that intersect the ideal of relations of ${{\rm Cox}(\overline{M}_{0,n})}$ trivially. As applications, we give a combinatorial way to partially solve the Riemann-Roch problem for ${\overline{M}_{0,n}}$ , and we show that all relations in degrees of ${{\rm Cox}(\overline{M}_{0,6})}$ arising from certain pull-backs from projective spaces are generated by the Plücker relations. 相似文献
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