English

Lattices over Polynomial Rings and Applications to Function Fields

Number Theory 2016-01-08 v1

Abstract

This paper deals with lattices (L, )(L,\Vert~\Vert) over polynomial rings, where LL is a finitely generated module over k[t]k[t], the polynomial ring over the field kk in the indeterminate tt, and  \Vert~\Vert is a discrete real-valued length function on Lk[t]k(t)L\otimes_{k[t]}k(t). A reduced basis of (L, )(L,\Vert~\Vert) is a basis of LL whose vectors attain the successive minima of (L, )(L,\Vert~\Vert). We develop an algorithm which transforms any basis of LL into a reduced basis of (L, )(L,\Vert~\Vert). By identifying a divisor DD of an algebraic function field with a lattice (L, )(L,\Vert~\Vert) over a polynomial ring, this reduction algorithm can be addressed to the computation of the Riemann-Roch space of DD and the successive minima of (L, )(L,\Vert~\Vert), without the use of any series expansion.

Keywords

Cite

@article{arxiv.1601.01361,
  title  = {Lattices over Polynomial Rings and Applications to Function Fields},
  author = {Jens-Dietrich Bauch},
  journal= {arXiv preprint arXiv:1601.01361},
  year   = {2016}
}

Comments

32 pages

R2 v1 2026-06-22T12:24:23.163Z