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Norli Bokhandel

Algebraic Varieties: Minimal Models and Finite Generation

2024, Innbundet, Engelsk

819,-

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The finite generation theorem is a major achievement in modern algebraic geometry. Based on the minimal model theory, it states that the canonical ring of an algebraic variety defined over a field of characteristic 0 is a finitely generated graded ring. This graduate-level text is the first to explain this proof. It covers the progress on the minimal model theory over the last 30 years, culminating in the landmark paper on finite generation by Birkar-Cascini-Hacon-McKernan. Building up to this proof, the author presents important results and techniques that are now part of the standard toolbox of birational geometry, including Mori's bend-and-break method, vanishing theorems, positivity theorems, and Siu's analysis on multiplier ideal sheaves. Assuming only the basics in algebraic geometry, the text keeps prerequisites to a minimum with self-contained explanations of terminology and theorems.

Produktegenskaper

  • Forfatter

  • Bidragsyter

    Chen Jiang (Oversetter)
  • Forlag/utgiver

    Cambridge University Press
  • Format

    Innbundet
  • Språk

    Engelsk
  • Utgivelsesår

    2024
  • Antall sider

    262
  • Serienavn

    Cambridge Studies in Advanced Mathematics
  • Utgivelsesdato

    27.06.2024
  • Varenummer

    9781009344678

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