International Mathematics Research Notices

International Mathematics Research Notices (2007) Vol. 2007 : article ID rnm017, 15 pages, doi:10.1093/imrn/rnm017 published on May 24, 2007

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Copyright © The Author 2007. Published by Oxford University Press.

Monodromy of Stable Curves of Compact Type: Rigidity and Extension

Marco Boggi

Institut de Mathématiques de Jussieu; 175, rue du Chevaleret; 75013 Paris

Correspondence: Correspondence to be sent to: Institut de Mathématiques de Jussieu; 175, rue du Chevaleret; 75013 Paris. boggi{at}math.jussieu.fr

Let _{g , n}, for 2g – 2 + n > 0, be the moduli stack of n-pointed, genus g, smooth curves. For a family C S of such curves over a connected base and a geometric point on S, the associated monodromy representation is the induced homomorphism on algebraic fundamental groups. It is well known that, if S is irreducible, reduced and locally of finite type over a field k of characteristic zero, the fibre C and the corresponding monodromy representation determine the relative isomorphism class of the family. In the first part of the paper, it is shown that suitable quotients of this representation suffice.

These results are then applied to show that the monodromy representation associated to a family C S of n-pointed, genus g, stable curves of compact type, that is, the induced homomorphism (where, denotes the moduli stack of n-pointed, genus g, stable curves of compact type), characterizes trivial and isotrivial families.

Let U be an open subscheme of a normal, irreducible, locally noetherian scheme S over a field k of characteristic zero and let C S be a family of stable curves of compact type. In the scond part of he paper, a monodromy criterion is given for extending C S to a family of stable curves of compact type over S.

References

1. Grothendieck A. Un Théorème sur les Homomorphismes de Schémas Abéliens. Inventiones Mathematicae (1966) 2:59–78.[CrossRef]
2. Noohi B. Fundamental groups of algebraic stacks. Journal of the Institute of Mathematics of Jussieu (2004) 3(no.1):69–103.[CrossRef]
3. Oort F. Subvarieties of moduli spaces. Inventiones Mathematicae (1974) 24:95–119.[CrossRef][Web of Science]
4. Matsumoto M., Tamagawa A. Mapping class group action versus Galois action on profinite fundamental groups. American Journal of Mathematics (2000) 122(no.5):1017–1026.[CrossRef][Web of Science]
5. Milne J. S., Cornell G. Arithmetic Geometry—Silvermann J. H., ed. (1985) New York: Springer-Verlag. 167–211. Jacobian Varieties.
6. Deligne P., Mumford D. The irreducibility of the space of curves of given genus. Publications Mathématiques de 'Institut des Hautes Études Scientifiques (1969) 36:75–109.
7. Pikaart M., de Jong A. J. The Moduli Space of Curves—Dijkgraaf R., Faber C., van der Geer G., eds. (1995) Boston: Birkhäuser. 483–510. Moduli of curves with non-abelian level structure.
8. Boggi M. Profinite Teichmüller theory. Mathematische Nachrichten (2006) 279(no.9-10):953–987.[CrossRef][Web of Science]
9. Boggi M. Fundamental groups of moduli stacks of stable curves of compact type. (2007) Preprint arXiv: math.AG/0604271 v2.
10. Stix J. A monodromy criterion for extending curves. International Mathematics Research Notices (2005) 29:1787–1802.
11. Stix J. Maps to anabelian varieties and extending of curves. (2004) Preprint.
12. Boggi M., Pikaart M. Galois covers of moduli of curves. Compositio Mathematica (2000) 120:171–191.[CrossRef][Web of Science]
13. Pikaart M. Moduli spaces of curves: stable cohomology and Galois covers. (1997) PhD thesis, Utrecht University.

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This Article Abstract Full Text (PDF) Alert me when this article is cited Alert me if a correction is posted Services Email this article to a friend Similar articles in this journal Alert me to new issues of the journal Add to My Personal Archive Download to citation manager Request Permissions How to cite this article Google Scholar Articles by Boggi, M. Search for Related Content Social Bookmarking          What's this?