Completeness of the list of spinor regular ternary quadratic forms

@article{Earnest2017CompletenessOT,
  title={Completeness of the list of spinor regular ternary quadratic forms},
  author={A. G. Earnest and Anna Haensch},
  journal={arXiv: Number Theory},
  year={2017}
}
Extending the notion of regularity introduced by Dickson in 1939, a positive definite ternary integral quadratic form is said to be spinor regular if it represents all the positive integers represented by its spinor genus (that is, all positive integers represented by any form in its spinor genus). Jagy conducted an extensive computer search for primitive ternary quadratic forms that are spinor regular, but not regular, resulting in a list of 29 such forms. In this paper, we will prove that… Expand
Classification of one-class spinor genera for quaternary quadratic forms
PRIME-UNIVERSAL QUADRATIC FORMS $ax^{2}+by^{2}+cz^{2}$ AND $ax^{2}+by^{2}+cz^{2}+dw^{2}$

References

SHOWING 1-7 OF 7 REFERENCES
There are 913 regular ternary forms
Representation by ternary quadratic forms
Introduction to quadratic forms
Spinor norms of local integral rotations. II.
Spinor Regular Positive Ternary Quadratic Forms