Vítězslav Kala, Siu Hang Man
Published 2024-03-27Version 1
We establish a new connection between sails, a key notion in the geometric theory of generalised continued fractions, and arithmetic of totally real number fields, specifically, universal quadratic forms and additively indecomposable integers. Our main application is to biquadratic fields, for which we show that if their signature rank is at least 3, then ranks of universal forms and numbers of indecomposables grow as a power of the discriminant. We also construct a family in which these numbers grow only logarithmically.
Universal quadratic forms, small norms and traces in families of number fields
Number fields without universal quadratic forms of small rank exist in most degrees
On Kitaoka's conjecture and lifting problem for universal quadratic forms
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