Producing "new" semi-orthogonal decompositions in arithmetic geometry

Abstract

This paper is devoted to constructing "new" admissible subcategories and semi-orthogonal decompositions of triangulated categories out of "old" ones. For two triangulated subcategories T and T' of a certain D and a decomposition (L,R) of T we look either for a decomposition (L',R') of T' such that there are no non-zero D-morphisms from L into L' and from R into R', or for a decomposition (LD,RD) of D such that LD T=L and RD T=R. We prove some general existence statements (that also extend to semi-orthogonal decompositions with any number of components) and apply them to various derived categories of coherent sheaves over a scheme X that is proper over a noetherian ring R. This gives a one-to-one correspondence between semi-orthogonal decompositions of Dperf(X) and Dbcoh(X); the latter extend to D-coh(X), D+coh(Qcoh(X)), Dcoh(Qcoh(X)), and D(Qcoh(X)) under very mild conditions. In particular, we obtain a vast generalization of a theorem of J. Karmazyn, A. Kuznetsov, and E. Shinder. These applications rely on recent results of Neeman that express Dbcoh(X) and D-coh(X) in terms of Dperf(X) along with its new variations corresponding to D+coh(Qcoh(X)) and Dcoh(Qcoh(X)). We also discuss an application of this theorem to the construction of certain adjoint functors.