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On the log version of Serrano's conjecture
- Publication Year :
- 2023
-
Abstract
- In this paper, we continue the study of Serrano's conjecture in low dimensions. We focus on two special cases of the log version of Serrano's conjecture: the ampleness conjecture and the log version of Campana--Peternell's conjecture. In dimension 3, we prove that the ampleness conjecture holds for non-canonical singularities; by the same method, we also prove that the log canonical version of Campana--Peternell's conjecture holds in dimension 3. In dimension 4, we improve the results on Campana--Peternell's conjecture by excluding the case that the numerical dimension of the anti-canonical divisor is 3. Specifically, we show that for a projective smooth fourfold $X$, if $-K_X$ is strictly nef but not ample, then $\kappa(X, -K_X)=0$ and $\nu(X, -K_X)=2$; in this case, if we further assume that $X$ admits a Fano contraction $X\to Y$ onto a surface $Y$ induced by some extremal ray, then $\rho(X)=2$.<br />Comment: 15pages, comments are welcome. v2: small revisions
- Subjects :
- Mathematics - Algebraic Geometry
Subjects
Details
- Database :
- arXiv
- Publication Type :
- Report
- Accession number :
- edsarx.2302.06209
- Document Type :
- Working Paper