Triangulated endofunctors of the derived category of coherent sheaves which do not admit DG liftings

Abstract

Recently, Rizzardo and Van den Bergh constructed an example of a triangulated functor between the derived categories of coherent sheaves on smooth projective varieties over a field k of characteristic 0 which is not of the Fourier-Mukai type. The purpose of this note is to show that if char \, k =p then there are very simple examples of such functors. Namely, for a smooth projective Y over Zp with the special fiber i: X Y, we consider the functor L i* i*: Db(X) Db(X) from the derived categories of coherent sheaves on X to itself. We show that if Y is a flag variety which is not isomorphic to P1 then L i* i* is not of the Fourier-Mukai type. Note that by a theorem of Toen (t, Theorem 8.15) the latter assertion is equivalent to saying that L i* i* does not admit a lifting to a Fp-linear DG quasi-functor Dbdg(X) Dbdg(X), where Dbdg(X) is a (unique) DG enhancement of Db(X). However, essentially by definition, L i* i* lifts to a Zp-linear DG quasi-functor.