Floer theory of higher rank quiver 3-folds

Abstract

We study threefolds Y fibred by Am-surfaces over a curve S of positive genus. An ideal triangulation of S defines, for each rank m, a quiver Q(m), hence a CY3-category (C,W) for any potential W on Q(m). We show that for ω in an open subset of the K\"ahler cone, a subcategory of a sign-twisted Fukaya category of (Y,ω) is quasi-isomorphic to (C,W[ω]) for a certain generic potential W[ω]. This partially establishes a conjecture of Goncharov concerning `categorifications' of cluster varieties of framed PGLm+1-local systems on S, and gives a symplectic geometric viewpoint on results of Gaiotto, Moore and Neitzke.