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Modifications et cycles \'{e}vanescents sur une base de dimension sup\'{e}rieure \`{a} un

代数几何 2007-06-13 v1

摘要

For a given morphism of schemes f:X->S, a sheaf F on X, a geometric point x on X, and s=f(x), the morphism f\_x : X(x) -> S(s) between the strict henselizations doesn't necessarily behave (with respect to F) like a proper morphism. However, we know it is so (assuming constructibility of F etc.) if S is the spectrum of a dvr (P. Deligne, SGA 4 1/2, [Th. finitude]). In this article, we prove it becomes so after an appropriate modification of the base S. The main ingredient is a theorem by A.J. de Jong on plurinodal fibrations. An application of this formalism to Lefschetz pencils is given.

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引用

@article{arxiv.math/0507475,
  title  = {Modifications et cycles \'{e}vanescents sur une base de dimension sup\'{e}rieure \`{a} un},
  author = {Fabrice Orgogozo},
  journal= {arXiv preprint arXiv:math/0507475},
  year   = {2007}
}

备注

In French. Submitted to IMRN