2020
DOI: 10.48550/arxiv.2012.00266
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Maximal log Fano manifolds are generalized Bott towers

Abstract: We prove that maximal log Fano manifolds are generalized Bott towers. As an application, we prove that in each dimension, there is a unique maximal snc Fano variety satisfying Friedman's d-semistability condition. Contents 1. Introduction 1 2. Sketch of the proof 3 3. Preliminaries 4 4. Adjunction theory 6 5. Geometry of maximal log Fano manifolds 8 6. Looking for a line 11 7. The case ρ(X) = ρ(D 1 ) + 1 14 8. The case ρ(X) = ρ(D 1 ) 17 9. Proof of Theorem 5.1 19 10. Maximal degeneration 20 Appendix A. General… Show more

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“…Here X is the blow up of a point on P 3 . One checks that in this case the nef value is equal to 2, and the nef value morphism is a contraction to a point, see Example 4.6 in [LM20]. Hence, the first step as the special MMP is not uniquely determined: it can be either the blow down of E, or a P 1 -bundle over P 2 .…”
Section: Classificationmentioning
confidence: 99%
“…Here X is the blow up of a point on P 3 . One checks that in this case the nef value is equal to 2, and the nef value morphism is a contraction to a point, see Example 4.6 in [LM20]. Hence, the first step as the special MMP is not uniquely determined: it can be either the blow down of E, or a P 1 -bundle over P 2 .…”
Section: Classificationmentioning
confidence: 99%