Item Infomation
| Title: |
| Enumerating odd-degree hyperelliptic curves and abelian surfaces over P1 |
| Authors: |
| Changho, Han Jun-Yong, Park |
| Issue Date: |
| 2023 |
| Publisher: |
| Springer |
| Abstract: |
| As explained therein by Venkatesh, in many interesting number theory problems (e.g., counting number fields, arithmetic curves or abelian varieties over a number field) one has not only a main term in the asymptotic count, but a secondary term or more. We have very little understanding of these lower order terms. They are not just of theoretical interest: when one tries to verify the conjectures numerically, one finds that the secondary terms are dominant in the computational range. For example, the number of cubic number fields of height ≤B for certain constants a,b>0 is aB+bB5/6+o(B56). |
| Description: |
| CC BY |
| URI: |
| https://link.springer.com/article/10.1007/s00209-023-03260-3 https://dlib.phenikaa-uni.edu.vn/handle/PNK/7467 |
| Appears in Collections |
| OER - Khoa học Tự nhiên |
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