Enumeration of Real Conics and Maximal Configurations
classification
🧮 math.AG
keywords
conicsrealconfigurationsmaximalpassingactuallycomplexconcerning
read the original abstract
We use floor decompositions of tropical curves to prove that any enumerative problem concerning conics passing through projective-linear subspaces in $\RP^n$ is maximal. That is, there exist generic configurations of real linear spaces such that all complex conics passing through these constraints are actually real.
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