A weak Fano threefold arising as a blowup of a curve of genus 5 and degree 8 on $${\mathbb {P}}^3$$

European Journal of Mathematics - Tập 5 - Trang 763-770 - 2019
Joseph W. Cutrone1, Michael A. Limarzi2, Nicholas A. Marshburn3
1Center for Data, Mathematical, and Computational Sciences, Goucher College, Baltimore, USA
2Department of Mathematics and Statistics, American University, Washington, USA
3Center for Talented Youth, Johns Hopkins University, Baltimore, USA

Tóm tắt

This article constructs a smooth weak Fano threefold of Picard number two with small anticanonical morphism that arises as a blowup of a smooth curve of genus 5 and degree 8 in $${\mathbb {P}}^3$$ . While the existence of this weak Fano was known as a numerical possibility in Cutrone and Marshburn (Cent Eur J Math 11(9):1552–1576, 2013) and constructed in Blanc and Lamy (Proc Lond Math Soc 105(5):1047–1075, 2012), this paper removes the dependencies on the results in Jahnke et al. (Cent Eur J Math 9(3):449–488, 2011) needed in the construction of Blanc and Lamy (Proc Lond Math Soc 105(5):1047–1075, 2012) and constructs the link in the style of Arap et al. (Math Scand 120(1):68–86, 2017).

Tài liệu tham khảo

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Thông tin xuất bản

European Journal of Mathematics

Tập 5

763-770

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