On Wirsing's problem in small exact degree

On Wirsing's problem in small exact degree

We investigate a variant of Wirsing's problem on approximation to a real number by real algebraic numbers of degree exactly \(n\). This has been studied by Bugeaud and Teulie. We improve their bounds for degrees up to \(n=7\). Moreover, we obtain results regarding small values of polynomials an...

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Veröffentlicht in:arXiv.org 2024-04
1. Verfasser: Schleischitz, Johannes
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Approximation
Criteria
Mathematical analysis
Polynomials
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Zusammenfassung:We investigate a variant of Wirsing's problem on approximation to a real number by real algebraic numbers of degree exactly \(n\). This has been studied by Bugeaud and Teulie. We improve their bounds for degrees up to \(n=7\). Moreover, we obtain results regarding small values of polynomials and approximation to a real number by algebraic integers in small prescribed degree. The main ingredient are irreducibility criteria for integral linear combinations of coprime integer polynomials. Moreover, for cubic polynomials these criteria improve results of Győry on a problem of Szegedy.
ISSN:2331-8422