Naïve Noncommutative Blowups at Zero-dimensional Schemes
نویسنده
چکیده
In an earlier paper [KRS] we defined and investigated the properties of the näıve blowup of an integral projective scheme X at a single closed point. In this paper we extend those results to the case when one näıvely blows up X at any suitably generic zero-dimensional subscheme Z. The resulting algebra A has a number of curious properties; for example it is noetherian but never strongly noetherian and the point modules are never parametrized by a projective scheme. This is despite the fact that the category of torsion modules in qgr-A is equivalent to the category of torsion coherent sheaves over X. These results are used in the companion paper [RS1] to prove that a large class of noncommutative surfaces can be written as näıve blowups.
منابع مشابه
Naïve Noncommutative Blowups at Zero-dimensional Schemes: an Appendix
R = R(X,Z,L, σ) = H(X, R) = k ⊕H(X, R1)⊕H(X, R2)⊕ · · · By [RS2, Theorem 3.1], R is noetherian with qgr-R ' qgr-R. Proposition 1.2. [RS2, Proposition 3.20]. Keep the above assumptions and assume that L is also ample and generated by its global sections. Then there exists M ∈ N such that, for m ≥M : (1) In ⊗ L⊗m n is generated by its global sections for all n ≥ 1. (2) R(X,Z,L⊗m, σ) is generated ...
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