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Main Author: Pastorino, Pier Roberto
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2510.20732
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author Pastorino, Pier Roberto
author_facet Pastorino, Pier Roberto
contents The larger the Lefschetz defect delta(X) of a smooth complex Fano variety X, the more information we can deduce about the geometry of X. The structure of varieties with delta(X) greater than 2 is known. In this paper, we study the case delta(X)=2. In particular, we focus on Fano varieties with delta(X)=2 arising from the so called Casagrande-Druel construction, which we refer to as Construction A. We show that among the 19 families of Fano 3-folds with delta(X)=2 classified by Mori and Mukai, 15 arise from such construction. Moreover, we construct all Fano 4-folds with Picard number greater than 3 and delta(X)=2 admitting such a structure, obtaining 147 distinct families in total. This completes the classification of all Casagrande-Druel Fano 4-folds with delta(X)=2. To broaden the scope, we also study a generalized version of Construction A, which we call Construction B, and we show that 18 out of the 19 families of Fano 3-folds with delta(X)=2 arise from it.
format Preprint
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On Casagrande-Druel Fano varieties with Lefschetz defect 2
Pastorino, Pier Roberto
Algebraic Geometry
14J45
The larger the Lefschetz defect delta(X) of a smooth complex Fano variety X, the more information we can deduce about the geometry of X. The structure of varieties with delta(X) greater than 2 is known. In this paper, we study the case delta(X)=2. In particular, we focus on Fano varieties with delta(X)=2 arising from the so called Casagrande-Druel construction, which we refer to as Construction A. We show that among the 19 families of Fano 3-folds with delta(X)=2 classified by Mori and Mukai, 15 arise from such construction. Moreover, we construct all Fano 4-folds with Picard number greater than 3 and delta(X)=2 admitting such a structure, obtaining 147 distinct families in total. This completes the classification of all Casagrande-Druel Fano 4-folds with delta(X)=2. To broaden the scope, we also study a generalized version of Construction A, which we call Construction B, and we show that 18 out of the 19 families of Fano 3-folds with delta(X)=2 arise from it.
title On Casagrande-Druel Fano varieties with Lefschetz defect 2
topic Algebraic Geometry
14J45
url https://arxiv.org/abs/2510.20732