Good tilting modules and recollements of derived module categories

Abstract

Let T be an infinitely generated tilting module of projective dimension at most one over an arbitrary associative ring A, and let B be the endomorphism ring of T. In this paper, we prove that if T is good then there exists a ring C, a homological ring epimorphism B C and a recollement among the (unbounded) derived module categories C of C, B of B, and A of A. In particular, the kernel of the total left derived functor TB L- is triangle equivalent to the derived module category C. Conversely, if the functor TB L- admits a fully faithful left adjoint functor, then T is a good tilting module. We apply our result to tilting modules arising from ring epimorphisms, and can then describe the rings C as coproducts of two relevant rings. Further, in case of commutative rings, we can weaken the condition of being tilting modules, strengthen the rings C as tensor products of two commutative rings, and get similar recollements. Consequently, we can produce examples (from commutative algebra and p-adic number theory, or Kronecker algebra) to show that two different stratifications of the derived module category of a ring by derived module categories of rings may have completely different derived composition factors (even up to ordering and up to derived equivalence),or different lengths. This shows that the Jordan-H\"older theorem fails even for stratifications by derived module categories, and also answers negatively an open problem by Angeleri-H\"ugel, K\"onig and Liu.