Plumbings of lens spaces and crepant resolutions of compound An singularities

Abstract

For many compound An (cAn) singularities Rf=C[u,v,x,y]/(uv-f(x,y)) with crepant resolutions Yf, their mirrors are affine An plumbings Wf of 3-dimensional lens spaces along circles. We prove two versions of homological mirror symmetry for these Stein 3-folds. (i) The uncompleted version: there is an equivalence DperfW(Wf) DbCoh(Yf) between the derived wrapped Fukaya category and the bounded derived category of coherent sheaves on some divisor complement Yf=Yf D. (ii) The completed version: there is an equivalence DperfW(Wf) DbCoh(Yf), where W(Wf) is the completion of W(Wf) with respect to the word-length filtration of Hamiltonian chords, and Yf is the complete local version of Yf. As an application of (i), we show that certain infinitely generated subgroup of the pure braid group PBrn+2 split injects into the compactly supported symplectic mapping class group of Wf as long as Rf is isolated, generalizing the work of Keating-Smith in the case of a conifold smoothing. Applying categorical localization to (ii), we obtain an equivalence between the (uncompleted) derived wrapped Fukaya category of the corresponding (non-affine) An plumbing Wf of lens spaces along circles and the relative singularity category of Yf. This generalizes the result of Smith-Wemyss in the case of double bubble plumbings and partially answers their realization question.