$P=W$ via $H_2$
Let $H_2$ be the Lie algebra of polynomial Hamiltonian vector fields on the symplectic plane. Let $X$ be the moduli space of stable Higgs bundles of fixed relatively prime rank and degree, or more generally the moduli space of stable parabolic Higgs bundles of arbitrary rank and degree for a generic stability condition. Let $H^*(X)$ be the cohomology with complex coefficients. Using the operations of cup-product by tautological classes and Hecke correspondences we construct an action of $H_2$ on $H^*(X)[x,y]$, where $x$ and $y$ are formal variables. We show that the perverse filtration on $H^*(X)$ coincides with the filtration canonically associated to $sl_2\subset H_2$ and deduce the $P=W$ conjecture of de Cataldo-Hausel-Migliorini.
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