On indefinite $k$-universal integral quadratic forms over number fields
Abstract
An integral quadratic lattice is called indefinite -universal if it represents all integral quadratic lattices of rank for a given positive integer . For , we prove that the indefinite -universal property satisfies the local-global principle over number fields. For , we show that a number field admits an integral quadratic lattice which is locally -universal but not indefinite 2-universal if and only if the class number of is even. Moreover, there are only finitely many classes of such lattices over . For , we prove that admits a classic integral lattice which is locally classic -universal but not classic indefinite -universal if and only if has a quadratic unramified extension where all dyadic primes of split completely. In this case, there are infinitely many classes of such lattices over . All quadratic fields with this property are determined.
Cite
@article{arxiv.2201.10730,
title = {On indefinite $k$-universal integral quadratic forms over number fields},
author = {Zilong He and Yong Hu and Fei Xu},
journal= {arXiv preprint arXiv:2201.10730},
year = {2023}
}
Comments
27 pages, terminology changed a bit, results in section 6 strengthened