Abstract
We study classes P g , T ( α ; β ) on M g , n r t defined by pushing forward the virtual fundamental classes of spaces of relative stable maps to an unparameterized P 1 with prescribed ramification over 0 and ∞ . A comparison with classes Q g , T arising from sections of the universal Jacobian shows that the classes P g , T ( α ; β ) are polynomials in the parts of the partitions indexing the special ramification data. Virtual localization on moduli spaces of relative stable maps gives sufficient relations to compute the coefficients of these polynomials in various cases.
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