The finitistic dimension conjecture via DG-rings

Abstract

Given an associative ring A, we present a new approach for establishing the finiteness of the big finitistic projective dimension FPD(A). The idea is to find a sufficiently nice non-positively graded differential graded ring B such that H0(B) = A and such that FPD(B) < ∞. We show that one can always find such a B provided that A is noetherian and has a noncommutative dualizing complex. We then use the intimate relation between D(B) and D(H0(B)) to deduce results about FPD(A). As an application, we generalize a recent sufficient condition of Rickard, for FPD(A) < ∞ in terms of generation of D(A) from finite dimensional algebras over a field to all noetherian rings which admit a dualizing complex.