宣誓书 发表于 2025-3-23 11:40:59

Rationally Connected Fibrations and Applications structure provides us a splitting of a uniruled variety into rationally connected varieties and a non-uniruled variety. . is a natural generalization of unirationality, and in dimension two or three, we can completely characterize rationally connected varieties in terms of global holomorphic differ

TOXIN 发表于 2025-3-23 16:46:07

Prerequisitesmentary knowlegde on spectral sequences as found in . There are two more advanced tools not covered by these two books which will be used over and over: the theorem of Riemann-Roch on projective manifolds (see ) and Hironaka’s desingularisation (see Hironaka’s original paper or, for refe

Binge-Drinking 发表于 2025-3-23 21:51:56

Book 1997ic p, while Part 2 is principally concerned with vanishing theorems and their geometric applications. Part I Geometry of Rational Curves on Varieties Yoichi Miyaoka RIMS Kyoto University 606-01 Kyoto Japan Introduction: Why Rational Curves? This note is based on a series of lectures given at the Mat

喊叫 发表于 2025-3-23 23:13:06

Foliations and Purely Inseparable Coveringsties..What relates this new criterion of uniruledness in characteristic . to the one in characteristic zero is “semistability”. The theory of semistable torsion free sheaves will be discussed in the second section, including numerical characterizations of semistability (in characteristic zero) and i

DUCE 发表于 2025-3-24 02:55:21

Abundance for Minimal 3-Foldsibration is also essential in the argument..In Section 3, the non-negativity of the Kodaira dimension of a minimal threefold is proved. The key to the proof is the pseudo-effectivity of . proved in Lecture III. We are exceptionally lucky in this case, because the Todd classes involve only . and . in

是他笨 发表于 2025-3-24 07:17:43

Erhard Schütz,Jochen Vogt u. a.ties..What relates this new criterion of uniruledness in characteristic . to the one in characteristic zero is “semistability”. The theory of semistable torsion free sheaves will be discussed in the second section, including numerical characterizations of semistability (in characteristic zero) and i

Albumin 发表于 2025-3-24 13:27:58

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CERE 发表于 2025-3-24 16:18:04

1661-237X Varieties Yoichi Miyaoka RIMS Kyoto University 606-01 Kyoto Japan Introduction: Why Rational Curves? This note is based on a series of lectures given at the Mat978-3-7643-5490-9978-3-0348-8893-6Series ISSN 1661-237X Series E-ISSN 2296-5041

Limousine 发表于 2025-3-24 20:57:16

Geometry of Higher Dimensional Algebraic Varieties

gerontocracy 发表于 2025-3-24 23:20:01

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查看完整版本: Titlebook: Geometry of Higher Dimensional Algebraic Varieties; Yoichi Miyaoka,Thomas Peternell Book 1997 Springer Basel AG 1997 Algebra.Complex analy