A constructive approach to Fourier-Mukai transforms for projective spaces via A∞-functors between pretriangulated dg categories

Abstract

We discuss the following problem: how can an arbitrary Fourier-Mukai transform φ: Db( Pa ) → Db( Pb ) between the bounded derived categories of two projective spaces of dimensions a and b be expressed in explicit terms as an exact functor between the homotopy categories Kb( Ba ) → Kb( Bb ) generated by the full strong exceptional sequences of the line bundles Ba = \O(-a), …, O\ and Bb = \O(-b), …, O\? We show that this problem can be reduced to the following task which is independent of any prescribed Fourier-Mukai kernel: finding an A∞-functor P in explicit terms whose induced functor on homotopy categories yields the embedding of \ O(i) O(j) i = -2a, …, 0, ~~j = -2b, … 0 \ into Db( Pa × Pb). As our main technical tool we provide an explicit formula for the lift of an A∞-functor F: A → B between a dg category A and a pretriangulated dg category B to the pretriangulated hull of A given by the universal property of pretriangulated hulls. As a further application of this tool, we provide a simple example of two non-isomorphic exact functors between triangulated categories that coincide on the full subcategory generated by a full strong exceptional sequence.