Curves in the disc, the type B braid group, and the type B zigzag algebra

Abstract

We construct a finite dimensional quiver algebra from the non-simply laced type B Dynkin diagram, which we call the type B zigzag algebra. This leads to a faithful categorical action of the type B braid group A(B), acting on the homotopy category of its projective modules. This categorical action is also closely related to the topological action of A(B), viewed as mapping class group of the punctured disc -- hence our exposition can be seen as a type B analogue of Khovanov-Seidel's work in arXiv:math/0006056v2. Moreover, we show that certain category of bimodules over our type B zigzag algebra is a quotient category of Soergel bimodules, resulting in an alternative proof to Rouquier's conjecture on the faithfulness of the 2-braid groups for type B.