Details
Original language | English |
---|---|
Number of pages | 12 |
Publication status | E-pub ahead of print - 13 Sept 2021 |
Abstract
Cite this
- Standard
- Harvard
- Apa
- Vancouver
- BibTeX
- RIS
2021.
Research output: Working paper/Preprint › Preprint
}
TY - UNPB
T1 - On the degree of algebraic cycles on hypersurfaces
AU - Paulsen, Matthias
PY - 2021/9/13
Y1 - 2021/9/13
N2 - Let X⊂ℙ4 be a very general hypersurface of degree d≥6. Griffiths and Harris conjectured in 1985 that the degree of every curve C⊂X is divisible by d. Despite substantial progress by Kollár in 1991, this conjecture is not known for a single value of d. Building on Kollár's method, we prove this conjecture for infinitely many d, the smallest one being d=5005. The set of these degrees d has positive density. We also prove a higher-dimensional analogue of this result and construct smooth hypersurfaces defined over ℚ that satisfy the conjecture.
AB - Let X⊂ℙ4 be a very general hypersurface of degree d≥6. Griffiths and Harris conjectured in 1985 that the degree of every curve C⊂X is divisible by d. Despite substantial progress by Kollár in 1991, this conjecture is not known for a single value of d. Building on Kollár's method, we prove this conjecture for infinitely many d, the smallest one being d=5005. The set of these degrees d has positive density. We also prove a higher-dimensional analogue of this result and construct smooth hypersurfaces defined over ℚ that satisfy the conjecture.
U2 - 10.48550/arXiv.2109.06303
DO - 10.48550/arXiv.2109.06303
M3 - Preprint
BT - On the degree of algebraic cycles on hypersurfaces
ER -