English

Naive Noncommutative Blowing Up

Rings and Algebras 2016-09-07 v1 Algebraic Geometry Quantum Algebra

Abstract

Let B(X,L,s) be the twisted homogeneous coordinate ring of an irreducible variety X over an algebraically closed field k with dim X > 1. Assume that c in X and s in Aut(X) are in sufficiently general position. We show that if one follows the commutative prescription for blowing up X at c, but in this noncommutative setting, one obtains a noncommutative ring R=R(X,c,L,s) with surprising properties. In particular: (1) R is always noetherian but never strongly noetherian. (2) If R is generated in degree one then the images of the R-point modules in qgr(R) are naturally in (1-1) correspondence with the closed points of X. However, both in qgr(R) and in gr(R), the R-point modules are not parametrized by a projective scheme. (3) qgr R has finite cohomological dimension yet H^1(R) is infinite dimensional. This gives a more geometric approach to results of the second author who proved similar results for X=P^n by algebraic methods.

Keywords

Cite

@article{arxiv.math/0306244,
  title  = {Naive Noncommutative Blowing Up},
  author = {D. S. Keeler and D. Rogalski and J. T. Stafford},
  journal= {arXiv preprint arXiv:math/0306244},
  year   = {2016}
}

Comments

Latex, 42 pages