T-adic exponential sums over finite fields

Chunlei Liu; Daqing Wan

T-adic exponential sums over finite fields

Number Theory 2009-01-07 v4 Algebraic Geometry

Authors: Chunlei Liu , Daqing Wan

Abstract

$T$ -adic exponential sums associated to a Laurent polynomial $f$ are introduced. They interpolate all classical $p^m$ -power order exponential sums associated to $f$ . The Hodge bound for the Newton polygon of $L$ -functions of $T$ -adic exponential sums is established. This bound enables us to determine, for all $m$ , the Newton polygons of $L$ -functions of $p^m$ -power order exponential sums associated to an $f$ which is ordinary for $m=1$ . Deeper properties of $L$ -functions of $T$ -adic exponential sums are also studied. Along the way, new open problems about the $T$ -adic exponential sum itself are discussed.

Keywords

p-adic analysis exponential sums special functions and series expansions

Cite

@article{arxiv.0802.2589,
  title  = {T-adic exponential sums over finite fields},
  author = {Chunlei Liu and Daqing Wan},
  journal= {arXiv preprint arXiv:0802.2589},
  year   = {2009}
}

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new version, 21 pages, title is changed too

T-adic exponential sums over finite fields

Abstract

Keywords

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