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Criteria for $\sigma$-ampleness

Author(s): Dennis S. Keeler
Journal: J. Amer. Math. Soc. 13 (2000), 517-532.
MSC (2000): Primary 14A22, 14F17, 14J50, 16P90, 16S38, 16W50
Posted: March 29, 2000
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Abstract:

In the noncommutative geometry of Artin, Van den Bergh, and others, the twisted homogeneous coordinate ring is one of the basic constructions. Such a ring is defined by a $\sigma$-ample divisor, where $\sigma$ is an automorphism of a projective scheme $X$. Many open questions regarding $\sigma$-ample divisors have remained.

We derive a relatively simple necessary and sufficient condition for a divisor on $X$ to be $\sigma$-ample. As a consequence, we show right and left $\sigma$-ampleness are equivalent and any associated noncommutative homogeneous coordinate ring must be noetherian and have finite, integral GK-dimension. We also characterize which automorphisms $\sigma$ yield a $\sigma$-ample divisor.

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Additional Information:

Dennis S. Keeler
Affiliation: Department of Mathematics, University of Michigan, Ann Arbor, Michigan 48109-1109
Email: dskeeler@umich.edu

DOI: 10.1090/S0894-0347-00-00334-9
PII: S 0894-0347(00)00334-9
Keywords: Noetherian graded rings, noncommutative projective geometry, automorphisms, vanishing theorems
Received by editor(s): December 13, 1999
Posted: March 29, 2000
Additional Notes: The author was partially supported by NSF grant DMS-9801148.
Copyright of article: Copyright 2000, American Mathematical Society

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The following works have cited this article

D. S. Keeler, The rings of noncommutative projective geometry, Advances in Algebra and Geometry (Hyderabad, 2001), Hindustan Book Agency, 2003, pp. 195--207.

J. T. Stafford and M. Van den Bergh, Noncommutative curves and noncommutative surfaces, Bull. Amer. Math. Soc. 38 (2001), 171-216. MR 2002d:16036

C. Ohn, ``Classical'' flag varieties for quantum groups: the standard quantum ${\rm SL}(n,\bold C)$, Adv. Math. 171 (2002), 103--138.

D. S. Keeler, Ample filters of invertible sheaves, J. Algebra 259 (2003), 243--283.

D. S. Keeler, Noncommutative ampleness for multiple divisors, J. Algebra 265 (2003), doi:10.1016/S0021-8693(03)00126-1, 299--311. MR 1 984 913

D. S. Keeler, D. Rogalski, and J. T. Stafford, Naive noncommutative blowing up, Duke Math. J. 126 (2005), 491--546. MR 2120116

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