Counting Curves in Elliptic Surfaces by Symplectic Methods
classification
🧮 math.SG
math.AG
keywords
surfacesciteellipticclassesformulainvariantsprimitivesymplectic
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We explicitly compute family GW invariants of elliptic surfaces for primitive classes. That involves establishing a TRR formula and a symplectic sum formula for elliptic surfaces and then determining the GW invariants using an argument from \cite{ip3}. In particular, as in \cite{bl1}, these calculations also confirm the well-known Yau-Zaslow Conjecture \cite{yz} for primitive classes in $K3$ surfaces.
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