Branes and Representations of DAHA C C1: affine braid group action on category
Abstract
We study the representation theory of the spherical double affine Hecke algebra (DAHA) of C C1, using brane quantization. By showing a one-to-one correspondence between Lagrangian A-branes with compact support and finite-dimensional representations of the spherical DAHA, we provide evidence of derived equivalence between the A-brane category of SL(2,C)-character variety of a four-punctured sphere and the representation category of DAHA of C C1. The D4 root system plays an essential role in understanding both the geometry and representation theory. In particular, this A-model approach reveals the action of an affine braid group of type D4 on the category. As a by-product, our geometric investigation offers detailed information about the low-energy effective dynamics of the SU(2) Nf=4 Seiberg-Witten theory.
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