Characterizing Projective Spaces for Varieties with at Most Quotient Singularities
Abstract
We generalize the well-known numerical criterion for projective spaces by Cho, Miyaoka and Shepherd-Barron to varieties with at worst quotient singularities. Let X be a normal projective variety of dimension n ≥ 3 with at most quotient singularities. Our result asserts that if C · (-KX) ≥ n+1 for every curve C ⊂ X, then X n.
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