Enumerative geometry (WiP)
© S. Xambó

• Enumerative theory of conics in Pⁿ (1985).
• Sketch of a verification of Schubert's number 5 819 539 783 680 of twisted cubics (1987).
• Halphen's enumerative theory of conics and its extensions to higher order conditions (1987).
  

• Geometry of complete cuspidal plane cubics (1989).
  

• On Schubert's degenerations of cuspidal plane cubics (1990).
  

• On Halphen's first formula (1991).
  

• On the geometry of nodal plane cubics: the condition p (1991).
  

• On Calabi--Yau manifolds: bridging enumerative geometry and string theory (1994).
• Completing Hermann Schubert's work on the enumerative geometry of cuspidal cubics in P³ (2003).
• Computing the characteristic numbers of the variety of nodal plane cubics in P³ (2007).
• Computing some fundamental numbers of the variety of nodal cubics in P³ (2009).

For other work in this area, see

• Rational equivalence on some families of plane curves (1994)
• Using intersection theory (1996) and
• Enumerative Geometry. Proceedings, Sitges 1987 (1990, editor).

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Papers | SXD

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21.4.2014

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