On indefinite and potentially universal quadratic forms over number fields
From MaRDI portal
Publication:5863054
DOI10.1090/tran/8601zbMath1489.11056arXiv2004.02090OpenAlexW3014764882MaRDI QIDQ5863054
No author found.
Publication date: 10 March 2022
Full work available at URL: https://arxiv.org/abs/2004.02090
Related Items (3)
On indefinite \(k\)-universal integral quadratic forms over number fields ⋮ On Kitaoka's conjecture and lifting problem for universal quadratic forms ⋮ On \(k\)-universal quadratic lattices over unramified dyadic local fields
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Integral spinor norms in dyadic local fields. III
- A remark on spinor norms of local integral rotations. I
- Universal forms over \(\mathbb Q(\sqrt{5})\)
- Quaternary universal forms over \(\mathbb Q(\sqrt{13})\)
- Darstellung durch Spinorgeschlechter ternärer quadratischer Formen
- Integral spinor norms in dyadic local fields. I
- Integral spinor norm groups over dyadic local fields.
- Minimal norm Jordan splittings of quadratic lattices over complete dyadic discrete valuation rings
- Representations of indefinite ternary quadratic forms over number fields
- Universal octonary diagonal forms over some real quadratic fields.
- Universal quadratic forms over multiquadratic fields
- On the rank of universal quadratic forms over real quadratic fields
- Spinor norms of local integral rotations. I
- Generation of integral orthogonal groups over dyadic local fields
- A lower bound for the rank of a universal quadratic form with integer coefficients in a totally real number field
- Über die Darstellung total positiver Zahlen des Körpers \(R(\sqrt 5)\) als Summe von drei Quadraten. (On the representation od totally positive numbers of the field \(R(\sqrt 5)\) as a sum of three squares)
- Sums of Three Integer Squares in Complex Quadratic Fields
- Sums of three squares over imaginary quadratic fields
- Representations of positive definite quadratic forms.
- On Representation of Integers by Quadratic Forms
- Representations of indefinite quadratic forms
- Universal positive quaternary quadratic lattices over totally real number fields
- Universality of a non-classical integral quadratic form over Q ( \sqrt 5 )
- On the Integral Representations of Quadratic Forms Over Local Fields
This page was built for publication: On indefinite and potentially universal quadratic forms over number fields
