Somnath Basu, Ritwik Mukherjee
Published 2013-08-13, updated 2014-09-22Version 2
In this paper we obtain an explicit formula for the number of degree d curves in two dimensional complex projective space, passing through (d(d+3)/2 -k) generic points and having a codimension k singularity, where k is at most 7. In the past, many of these numbers were computed using techniques from algebraic geometry. In this paper we use purely topological methods to count curves. Our main tool is a classical fact from differential topology: the number of zeros of a generic smooth section of a vector bundle V over M, counted with a sign, is the Euler class of V evaluated on the fundamental class of M.
Comments: 23 pages; it has been condensed from the previous version (57 pages) to keep the length reasonable
Enumeration of curves with two singular points
Counting curves in a linear system with upto eight singular points
Enumeration of singular hypersurfaces on arbitrary complex manifolds
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