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Yoichi Miyaoka (宮岡 洋一, Miyaoka Yōichi) is a mathematician who works in algebraic geometry and who proved (independently of Shing-Tung Yau's work) the Bogomolov–Miyaoka–Yau inequality in an Inventiones Mathematicae paper.

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  • Yoichi Miyaoka (en)
  • Yōichi Miyaoka (de)
  • 宮岡洋一 (ja)
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  • Yōichi Miyaoka (jap. 宮岡 洋一, Miyaoka Yōichi; * 1949 in Japan) ist ein japanischer Mathematiker, der sich mit Algebraischer Geometrie befasst. (de)
  • 宮岡 洋一(みやおか よういち、1949年 - )は、日本の数学者。中央大学理工学部教授、東京大学名誉教授。専門分野は代数幾何学。妻は数学者の宮岡礼子。 (ja)
  • Yoichi Miyaoka (宮岡 洋一, Miyaoka Yōichi) is a mathematician who works in algebraic geometry and who proved (independently of Shing-Tung Yau's work) the Bogomolov–Miyaoka–Yau inequality in an Inventiones Mathematicae paper. (en)
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  • Yōichi Miyaoka (jap. 宮岡 洋一, Miyaoka Yōichi; * 1949 in Japan) ist ein japanischer Mathematiker, der sich mit Algebraischer Geometrie befasst. (de)
  • 宮岡 洋一(みやおか よういち、1949年 - )は、日本の数学者。中央大学理工学部教授、東京大学名誉教授。専門分野は代数幾何学。妻は数学者の宮岡礼子。 (ja)
  • Yoichi Miyaoka (宮岡 洋一, Miyaoka Yōichi) is a mathematician who works in algebraic geometry and who proved (independently of Shing-Tung Yau's work) the Bogomolov–Miyaoka–Yau inequality in an Inventiones Mathematicae paper. In 1984, Miyaoka extended the Bogomolov–Miyaoka–Yau inequality to surfaces with quotient singularities, and in 2008 to orbifold surfaces. Doing so, he obtains sharp bound on the number of quotient singularities on surfaces of general type. Moreover, the inequality for orbifold surfaces gives explicit values for the coefficients of the so-called Lang-Vojta conjecture relating the degree of a curve on a surface with its geometric genus. (en)
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