Refined sheaf counting on local K3 surfaces
Abstract
We compute all refined sheaf counting invariants -- Vafa-Witten, reduced DT, stable pairs and Gopakumar-Vafa -- for all classes on local K3 surfaces. Along the way we develop rank 0 Vafa-Witten theory on K3 surfaces. An important feature of the calculation is that the ``instanton contribution" -- of sheaves supported scheme theoretically on S -- to any of the invariants depends only on the square of the class, not its divisibility.
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