Fourier transform for quantum -modules via the punctured torus mapping class group
Adrien Brochier
University of Edinburgh, UKDavid Jordan
University of Edinburgh, UK
Abstract
We construct a certain cross product of two copies of the braided dual of a quasitriangular Hopf algebra , which we call the elliptic double , and which we use to construct representations of the punctured elliptic braid group extending the well-known representations of the planar braid group attached to . We show that the elliptic double is the universal source of such representations. We recover the representations of the punctured torus braid group obtained in [15], and hence construct a homomorphism to the Heisenberg double , which is an isomorphism if is factorizable.
The universal property of endows it with an action by algebra automorphisms of the mapping class group of the punctured torus. One such automorphism we call the quantum Fourier transform; we show that when , the quantum Fourier transform degenerates to the classical Fourier transform on as .
Cite this article
Adrien Brochier, David Jordan, Fourier transform for quantum -modules via the punctured torus mapping class group. Quantum Topol. 8 (2017), no. 2, pp. 361–379
DOI 10.4171/QT/92