Categorical properties of reduction functors over non-positive DG-rings
Abstract
Given a non-positive DG-ring A, associated to it are the reduction and coreduction functors F(-) = H0(A)LA - and G(-) = RHomA(H0(A),-), considered as functors D(A) D(H0(A)), as well as the forgetful functor S:D(H0(A)) D(A). In this paper we carry a systematic study of the categorical properties of these functors. As an application, a new descent result for vanishing of Ext and Tor over ordinary commutative noetherian rings is deduced.
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