Addendum to "Measured foliations and Hilbert 12th problem"
Igor V. Nikolaev
TL;DR
This paper explores numerical examples of abelian extensions of real quadratic number fields, building on previous theoretical results to provide concrete instances and deepen understanding of these algebraic structures.
Contribution
It presents new numerical examples of abelian extensions of real quadratic fields, extending prior theoretical work to illustrate these concepts concretely.
Findings
Numerical examples of abelian extensions are provided.
The results support theoretical predictions about real quadratic fields.
Enhanced understanding of the structure of these extensions.
Abstract
We study numerical examples of the abelian extensions of the real quadratic number fields based on the results in Acta Mathematica Vietnamica 48 (2023), 271-281 (arXiv:0804.0057)
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Advanced Differential Equations and Dynamical Systems · Meromorphic and Entire Functions