Abstract
Let $X$ be a Gorenstein minimal projective $n$-fold with at worst locally factorial terminal singularities, and suppose that the canonical map of $X$ is generically finite onto its image. When $n \lt 4$, the canonical degree is universally bounded. While the possibility of obtaining a universal bound on the canonical degree of $X$ for $n \geq 4$ may be inaccessible, we give a uniform upper bound for the degrees of certain abelian covers. In particular, we show that if the canonical divisor $K_X$ defines an abelian cover over $\mathbb{P}^n$, i.e., when $X$ is an abelian canonical $n$-fold, then the canonical degree of $X$ is universally upper bounded by a constant which only depends on $n$ for $X$ nonsingular. We also construct two examples of nonsingular minimal projective $4$-folds of general type with canonical degrees $81$ and $128$.
Citation
Rong Du. Yun Gao. "On Abelian Canonical $n$-folds of General Type." Taiwanese J. Math. 21 (3) 653 - 664, 2017. https://doi.org/10.11650/tjm/7915
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