{"record_type":"pith_number_record","schema_url":"https://pith.science/schemas/pith-number/v1.json","pith_number":"pith:2017:ZTIJIJ2NQK75ANVCEMYINHIVNQ","short_pith_number":"pith:ZTIJIJ2N","schema_version":"1.0","canonical_sha256":"ccd094274d82bfd036a22330869d156c2e4503bc3cdbb19282b9ae99ffa446e8","source":{"kind":"arxiv","id":"1703.03516","version":2},"attestation_state":"computed","paper":{"title":"The a-number of hyperelliptic curves","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","headline":"","cross_cats":[],"primary_cat":"math.NT","authors_text":"Sarah Frei","submitted_at":"2017-03-10T02:12:41Z","abstract_excerpt":"It is known that for a smooth hyperelliptic curve to have a large $a$-number, the genus must be small relative to the characteristic of the field, $p>0$, over which the curve is defined. It was proven by Elkin that for a genus $g$ hyperelliptic curve $C$ to have $a_C=g-1$, the genus is bounded by $g<\\frac{3p}{2}$. In this paper, we show that this bound can be lowered to $g 0$, over which the curve is defined. It was proven by Elkin that for a genus $g$ hyperelliptic curve $C$ to have $a_C=g-1$, the genus is bounded by $g<\\frac{3p}{2}$. In this paper, we show that this bound can be lowered to $g