Canonical basis twists of ideal lattices from real quadratic number fields

Mohamed Damir, Lenny Fukshansky

Tutkimustuotos: LehtiartikkeliArticleScientificvertaisarvioitu

Abstrakti

Ideal lattices in the plane coming from real quadratic number fields have been investigated by several authors in the recent years. In particular, it has been proved that every such ideal has a basis that can be twisted by the action of the diagonal group into a Minkowski reduced basis for a well-rounded lattice. We explicitly study such twists on the canonical bases of ideals, which are especially important in arithmetic theory of quadratic number fields and binary quadratic forms. Specifically, we prove that every fixed real quadratic field has only finitely many ideals whose canonical basis can be twisted into a well-rounded or a stable lattice in the plane. We demonstrate some explicit examples of such twists. We also briefly discuss the relation between stable and well-rounded twists of arbitrary ideal bases.

the relation between stable and well-rounded twists of arbitrary ideal bases.
AlkuperäiskieliEnglanti
Sivut999-1019
JulkaisuHouston Journal of Mathematics
Vuosikerta45
TilaJulkaistu - 2019
OKM-julkaisutyyppiA1 Julkaistu artikkeli, soviteltu

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