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Separability, multi-valued operators, and zeroes of L-functions

数论 2007-05-23 v1

摘要

Let \k\k be a global function field in 1-variable over a finite extension of \Fp\Fp, pp prime, \infty a fixed place of \k\k, and \A\A the ring of functions of \k\k regular outside of \infty. Let EE be a Drinfeld module or TT-module. Then, as in \cite{go1}, one can construct associated characteristic pp LL-functions based on the classical model of abelian varieties {\it once} certain auxiliary choices are made. Our purpose in this paper is to show how the well-known concept of ``maximal separable (over the completion \k\k_\infty) subfield'' allows one to construct from such LL-functions certain separable extensions which are independent of these choices. These fields will then depend only on the isogeny class of the original TT-module or Drinfeld module and y\Zpy\in \Zp, and should presumably be describable in these terms. Moreover, they give a very useful framework in which to view the ``Riemann hypothesis'' evidence of \cite{w1}, \cite{dv1}, \cite{sh1}. We also establish that an element which is {\it separably} algebraic over \k\k_\infty can be realized as a ``multi-valued operator'' on general TT-modules. This is very similar to realizing 1/2 as the multi-valued operator xxx\mapsto \sqrt{x} on \C\C^\ast. Simple examples show that this result is false for non-separable elements. This result may eventually allow a ``two TT's'' interpretation of the above extensions in terms of multi-valued operators on EE and certain tensor twists.

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引用

@article{arxiv.math/9710222,
  title  = {Separability, multi-valued operators, and zeroes of L-functions},
  author = {David Goss},
  journal= {arXiv preprint arXiv:math/9710222},
  year   = {2007}
}