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Fractional Power Series and Pairings on Drinfeld Modules

Authors:	Bjorn Poonen

Institution:	Mathematical Sciences Research Institute, Berkeley, California 94720-5070

Abstract:	Let be an algebraically closed field containing ${{\Bbb F}_q}$ which is complete with respect to an absolute value . We prove that under suitable constraints on the coefficients, the series $f(z) = \sum _{n \in {\Bbb Z} } a_n z^{q^n}$ converges to a surjective, open, continuous ${{\Bbb F}_q}$ -linear homomorphism $C \rightarrow C$ whose kernel is locally compact. We characterize the locally compact sub- ${{\Bbb F}_q}$ -vector spaces of which occur as kernels of such series, and describe the extent to which determines the series. We develop a theory of Newton polygons for these series which lets us compute the Haar measure of the set of zeros of of a given valuation, given the valuations of the coefficients. The ``adjoint' series $f^\ast (z) = \sum _{n \in {\Bbb Z} } a_n^{1/q^n} z^{1/q^n}$ converges everywhere if and only if does, and in this case there is a natural bilinear pairing $\begin{displaymath}\ker f \times \ker f^\ast \rightarrow {{\Bbb F}_q} % \end{displaymath}$ which exhibits $\ker f^\ast$ as the Pontryagin dual of $\ker f$ . Many of these results extend to non-linear fractional power series. We apply these results to construct a Drinfeld module analogue of the Weil pairing, and to describe the topological module structure of the kernel of the adjoint exponential of a Drinfeld module.

Keywords:	Fractional power series Pontryagin duality Newton polygon Weil pairing Drinfeld module

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