Instanton Floer homology of almost-rational plumbings
Abstract
We show that if Y is the boundary of an almost-rational plumbing, then the framed instanton Floer homology I\#(Y) is isomorphic to the Heegaard Floer homology HF(Y; C). This class of 3-manifolds includes all Seifert fibered rational homology spheres with base orbifold S2 (we establish the isomorphism for the remaining Seifert fibered rational homology spheresx2014with base RP2x2014directly). Our proof utilizes lattice homology, and relies on a decomposition theorem for instanton Floer cobordism maps recently established by Baldwin and Sivek.
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