Quivers with potentials for cluster varieties associated to braid semigroups

Abstract

Let C be a simply laced generalized Cartan matrix. Given an element b of the generalized braid semigroup related to C, we construct a collection of mutation-equivalent quivers with potentials. A quiver with potential in such a collection corresponds to an expression of b in terms of the standard generators. For two expressions that differ by a braid relation, the corresponding quivers with potentials are related by a mutation. The main application of this result is a construction of a family of CY3 A∞-categories associated to elements of the braid semigroup related to C. In particular, we construct a canonical up to equivalence CY3 A∞-category associated to quotient of any Double Bruhat cell Gu,v/ Ad H in a simply laced reductive Lie group G. We describe the full set of parameters these categories depend on by defining a 2-dimensional CW-complex and proving that the set of parameters is identified with second cohomology group of this complex.