The Picard Group of a Noncommutative Algebraic Torus

Abstract

We compute the Picard group Pic(Aq) of the noncommutative algebraic 2-torus Aq, describe its action on the space R(Aq) of isomorphism classes of rk 1 projective modules and classify the algebras Morita equivalent to Aq . Our computations are based on a quantum version of the Calogero-Moser correspondence relating projective Aq-modules to irreducible representations of the double affine Hecke algebras (DAHA) Ht, q-1/2(Sn) at t = 1 . We show that, under this correspondence, the action of Pic(Aq) on R(Aq) agrees with the action of SL2(Z) on Ht, q-1/2(Sn) constructed by I.Cherednik. We compare our results with smooth and analytic cases. In particular, when |q| = 1 , we find that Pic(Aq) is isomorphic to the group of auto-equivalences Auteq(Db(X))/Z of the bounded derived category of coherent sheaves on the elliptic curve X = C*/Z modulo translations.