Corpus ID: 9439559

On Log Canonical Models of the Moduli Space of Stable Pointed Curves

@article{Simpson2007OnLC,
  title={On Log Canonical Models of the Moduli Space of Stable Pointed Curves},
  author={M. Simpson},
  journal={arXiv: Algebraic Geometry},
  year={2007}
}
  • M. Simpson
  • Published 2007
  • Mathematics
  • arXiv: Algebraic Geometry
  • We study the log canonical models of the moduli space MBar_{0,n} of pointed stable genus zero curves with respect to the standard log canonical divisors K+aD, where D denotes the boundary. In particular we show that, as a formal consequence of a conjecture by Fulton regarding the ample cone of MBar_{0,n}, these log canonical models are equal to certain of Hassett's weighted pointed curve spaces. 
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