Intersection theory of moduli space of stable N-pointed curves of genus zero

@article{Keel1992IntersectionTO,
  title={Intersection theory of moduli space of stable N-pointed curves of genus zero},
  author={S. Keel},
  journal={Transactions of the American Mathematical Society},
  year={1992},
  volume={330},
  pages={545-574}
}
  • S. Keel
  • Published 1992
  • Mathematics
  • Transactions of the American Mathematical Society
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We study the intersection theory of a class of projective linear spaces (generalizations of projective space bundles in which the fibres are linear but of varying dimensions). In particular we giveExpand
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A self-contained mechanism for the preparation handling and application of liquified materials such as coating compounds, joint sealers, crack fillers, waterproofing compounds and the like, isExpand
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