On units with complex Galois conjugates of equal absolute value
Keywords:
units, embeddings, l.c.K. metrics
Abstract
We investigate the following question:
Given a number field K with s real embeddings and 2t complex ones has a group of units such that all elements in U have all its complex conjugates of same absolute value, does it follow that t = 1?
This fact has an interesting implication in complex hermitian geometry, namely it describes all Oeljeklaus–Toma manifolds carrying locally conformally Kähler structures. We prove that the stated question has an affirmative answer under a (relatively mild) condition on K, namely that for some finitely may extensions L of it, L has finitely many units lying on some specific circle.
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Published
2026-01-12
How to Cite
Deaconu, Ștefan- A. (2026) “On units with complex Galois conjugates of equal absolute value”, Analele Universității ”Dunărea de Jos” din Galați. Fascicula II, Matematică, fizică, mecanică teoretică / Annals of the ”Dunarea de Jos” University of Galati. Fascicle II, Mathematics, Physics, Theoretical Mechanics, 48(2), pp. 139-143. Available at: https://gup.ugal.ro/ugaljournals/index.php/math/article/view/9560 (Accessed: 13January2026).
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