In this paper, we investigate Ding projective dimensions and Ding injective dimensions of modules and ringsLet R be a ring with r DP D(R) = n < ∞, and let W1 = {M|fd(M) < ∞}We prove that(DP, W1) is a complete hereditary cotorsion pair such that a module M belongs to DP ∩ W1 if and only if M is projective, moreover,W1 = {M|pd(M) < ∞} = {M|fd(M) ≤ n} = {M|pd(M) ≤ n}Then we introduce and investigate Ding derived functor Dexti(-,-), and use it to characterize global Ding dimensionWe show that if R is a Ding-Chen ring, or if R is a ring with r DP D(R) < ∞ and r DI D(R) < ∞,then r DP D(R) ≤ n if and only if r DI D(R) ≤ n if and only if Dextn+i(M, N) = 0 for all modules M and N and all integer i ≥ 1.
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