DOIAbstract
Enumerative tropical geometry allows to solve technical problems from enumerative algebraic geometry using combinatorial methods. This is possible due to the degenerative process of tropicaliziation, which e.g. transforms algebraic curves into metric graphs with specific properties. Well known results from complex algebraic geometry, such as the invariance of enumerative numbers, the Kontsevich formula to count rational curves in the plane or the Caporaso-Harris formula are easier to obtain. Enumerative real geometry, however, has resisted for a long time to the complex approach. Here, the tropical approach can show its advantage by producing recursive formulas for invariants of real rational curves through generic points in the plane, whic...
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