Fourier--Mukai transforms for non-commutative complex tori

Abstract

Let X be a complex torus of dimension g and X be the dual torus. For any g(g-1)/2-tuple λ of complex numbers of absolute value 1, we define a non-commutative complex torus Xλ as a sheaf of algebras on a real torus of dimension g. We prove that if all components of λ are roots of unity, then the category of coherent sheaves on Xλ is abelian and derived-equivalent to the category of coherent sheaves on X twisted by an element of the Brauer group of X determined by λ.