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Publication Date:
May 2012
ISSN:
1435-5337
DOI:
10.1515/form.2011.087

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Forum Mathematicum

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Solving algebraic equations in roots of unity

1 / 2

1School of Mathematics and Wales Institute of Mathematical and Computational Sciences, Cardiff University, Senghennydd Road, Cardiff CF24 4AG, UK

2School of Mathematics and Maxwell Institute for Mathematical Sciences, University of Edinburgh, Kings Buildings, Edinburgh EH9 3JZ, UK

Citation Information: Forum Mathematicum. Volume 24, Issue 3, Pages 641–665, ISSN (Online) 1435-5337, ISSN (Print) 0933-7741, DOI: 10.1515/form.2011.087, May 2012

Publication History:
Received:
2008-02-01
Revised:
2010-05-12
Published Online:
2012-05-01

Abstract.

This paper is devoted to finding solutions of polynomial equations in roots of unity. It was conjectured by S. Lang and proved by M. Laurent that all such solutions can be described in terms of a finite number of parametric families called maximal torsion cosets. We obtain new explicit upper bounds for the number of maximal torsion cosets on an algebraic subvariety of the complex algebraic -torus . In contrast to earlier work that gives the bounds of polynomial growth in the maximum total degree of defining polynomials, the proofs of our results are constructive. This allows us to obtain a new algorithm for determining maximal torsion cosets on an algebraic subvariety of .

Keywords: Torsion cosets; roots of unity

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