Genus 0 logarithmic and tropical fixed-domain counts for Hirzebruch surfaces
Abstract
For a non-singular projective toric variety X, the virtual logarithmic Tevelev degrees are defined as the virtual degree of the morphism from the moduli stack of logarithmic stable maps M(X) to the product Mg,n × Xn. In this paper, after proving the genus 0 correspondence theorem in this setting, we use tropical methods to provide closed formulas for the case in which X is a Hirzebruch surface. In order to do so, we explicitly list all the tropical curves contributing to the count.
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