Variation of GIT and Variation of Lagrangian Skeletons II: Quasi-Symmetric Case

Abstract

Consider (C*)k acting on CN satisfying certain 'quasi-symmetric' condition which produces a class of toric Calabi-Yau GIT quotient stacks. Using subcategories of Coh([CN / (C*)k]) generated by line bundles whose weights are inside certain zonotope called the 'magic window', Halpern-Leistner and Sam give a combinatorial construction of equivalences between derived categories of coherent sheaves for various GIT quotients. We apply the coherent-constructible correspondence for toric varieties to the magic windows and obtain a non-characteristic deformation of Lagrangian skeletons in RN-k parameterized by Rk, exhibiting derived equivalences between A-models of the various phases. Moreover, by translating the magic window zonotope in Rk, we obtain a universal skeleton over Rk × Rk D for some fattening of hyperplane arrangements D, and we show that the the universal skeleton induces a local system of categories over Rk × Rk D. We also connect our results to the perverse schober structure identified by Spenko and Van den Bergh.