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A Geometric Proof of Mordell's Conjecture for Function Fields

Algebraic Geometry 2007-05-23 v1

Abstract

Let \CalC,\CalC\Cal C,\Cal C' be curves over a base scheme SS with g(\CalC)2g(\Cal C)\ge 2. Then the functor T{T\mapsto\{generically smooth TT-morphisms T×S\CalCT×S\CalC}T\times_S\Cal C'\to T\times_S\Cal C\} from ((S((S-schemes)) to ((sets)) is represented by a quasi-finite unramified SS-scheme. From this one can deduce that for any two integers g2g\ge 2 and gg', there is an integer M(g,g)M(g,g') such that for any two curves C,CC,C' over any field kk with g(C)=gg(C)=g, g(C)=gg(C')=g', there are at most M(g,g)M(g,g') separable kk-morphisms CCC'\to C. It is conjectured that the arithmetic function M(g,g)M(g,g') is bounded by a linear function of gg'.

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Cite

@article{arxiv.math/0701407,
  title  = {A Geometric Proof of Mordell's Conjecture for Function Fields},
  author = {Kezheng Li},
  journal= {arXiv preprint arXiv:math/0701407},
  year   = {2007}
}

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15 pages