Projective algebraic varieties whose universal covering spaces are biholomorphic to C^n

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概要

• 論文の詳細を見る

• These varieties are conjectured to be abelian varieties up to finite étale coverings. This conjecture is derived from an a?rmative answer to the abundance conjecture in minimal model theory. In particular, this is true for n=3.

• 社団法人 日本数学会の論文

著者

• Nakayama Noboru

  Research Institute For Mathematical Sciences Kyoto University

関連論文

• Classification of normal quartic surfaces with irrational singularities
• Intersection sheaves over normal schemes
• Complex projective manifolds which admit non-isomorphic surjective endomorphisms (Higher Dimensional Algebraic Varieties and Vector Bundles)
• Projective algebraic varieties whose universal covering spaces are biholomorphic to C^n
• Compact complex surfaces admitting non-trivial surjective endomorphisms
• RULED SURFACES WITH NON-TRIVIAL SURJECTIVE ENDOMORPHISMS

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