Marco Valerio Giannone

Dottore di ricerca

ciclo: XXXIV


supervisore: A. Pisante
relatore: C. Pinzari

Titolo della tesi: Twisting quantum groups at the roots of unity.

Let G be a simply connected Lie group and g be its complexified Lie algebra. Building on the work of Wenzl, we present a weak tensor structure on the unitary modular categories arising from representation categories of quantum groups U_q(g) specialised at the root of 1 q, following a paper by Carpi, Ciamprone, Pinzari and the author. The theory therein developed allows us to reconstruct theses categories as representation categories of a discrete unitary coboundary weak Hopf algebra. Furthermore, we consider the twisted categories obtained by modifying the associator by means of 3-cocycles on the dual of the centre of G and reconstruct them as representation categories of suitable discrete unitary weak Hopf algebras; this is done by adaptation of the work of Neshveyev and Yamashita in the analogous scenario of the compact quantum group corresponding to U_q(g) specialised at q>1.

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