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Communications in Algebra Volume 36, 2008 - Issue 2
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Original Articles

The Integral Chow Ring of the Stack of at Most 1-Nodal Rational Curves

Dan Edidin Department of Mathematics, University of Missouri-Columbia, Columbia, Missouri, USACorrespondence[email protected]
&
Damiano Fulghesu Department of Mathematics, University of Missouri-Columbia, Columbia, Missouri, USA
Pages 581-594 | Received 16 Oct 2006, Published online: 07 Apr 2008

REFERENCES

  • Brion , M. ( 1997 ). Equivariant Chow groups for torus actions . Trans. Groups 2 ( 2 ): 225 – 267 .
  • Edidin , D. , Graham , W. ( 1997 ). Characteristic classes in the Chow ring . J. Algebraic Geom. 6 ( 3 ): 431 – 443 .
  • Edidin , D. , Graham , W. ( 1998a ). Equivariant intersection theory . Inv. Math. 131 : 595 – 634 .
  • Edidin , D. , Graham , W. ( 1998b ). Localization in equivariant intersection theory and the Bott residue formula . Amer. J. Math. 120 ( 3 ): 619 – 636 .
  • Fulghesu , D. ( 2005 ). The Integral Chow Ring of the Stack of Rational Curves. PhD thesis, Scuola Normale Superiore, Pisa .
  • Fulton , W. ( 1998 ). Intersection Theory . Berlin : Springer-Verlag .
  • Hartshorne , R. ( 1977 ). Algebraic Geometry . New York : Springer-Verlag .
  • Kresch , A. ( 1999 ). Cycle groups for Artin stacks . Inv. Math. 138 : 495 – 536 .
  • Pandharipande , R. ( 1998 ). Equivariant Chow rings of O(k), SO(2k + 1) and SO(4). J. Reine Angew. Math. 496 : 131 – 148 .
  • Vistoli , A. ( 1998 ). The Chow ring of 𝔐2 (Appendix to Edidin and Graham, 1998a) . Inv. Math. 131 : 635 – 644 .
  • Communicated by S. Kleiman.

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