Contractions and flips for varieties of small complexity

Brion M, Knop F (1994)

Publication Language: English

Publication Type: Journal article, Original article

Publication year: 1994

Journal

Journal of Mathematical Sciences - the University of Tokyo University of Tokyo

Publisher: University of Tokyo

Book Volume: 1

Pages Range: 641-655

Abstract

Let G be a connected reductive group and let X be a projective, unirational, normal G-variety of complexity at most one. Then we show that some of the basic problems of Mori theory have a positive solution for X: Every face of NE(X) can be contracted, flips exist, and every sequence of directed (or inverse) flips terminates.

Authors with CRIS profile

Friedrich Knop Lehrstuhl für Mathematik (Algebra und Geometrie)

How to cite

APA:

Brion, M., & Knop, F. (1994). Contractions and flips for varieties of small complexity. Journal of Mathematical Sciences - the University of Tokyo, 1, 641-655.

MLA:

Brion, Michel, and Friedrich Knop. "Contractions and flips for varieties of small complexity." Journal of Mathematical Sciences - the University of Tokyo 1 (1994): 641-655.

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