Kawamata--Miyaoka type inequality for Q-Fano varieties with canonical singularities
Abstract
Let X be an n-dimensional normal Q-factorial projective variety with canonical singularities and Picard number one such that X is smooth in codimension two, -KX is ample and n≥ 2. We prove that X satisfies the following Kawamata--Miyaoka type inequality: \[ c1(X)n< 4 c2(X)· c1(X)n-2. \] If additionally X is a threefold with terminal singularities, then a stronger inequality is also obtained.
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