Krull and Global Dimensions of Fully Bounded Noetherian Rings

Abstract: ABSTRACT. The main result of this paper states that the Krull dimension of a fully bounded Noetherian ring containing an uncountable central subfield is bounded above by its global dimension, provided that the latter is finite.The proof requires some results on projective dimensions and on localization (Corollary 4 and Theorem 11, respectively), which may be of independent interest. If P is a prime ideal in a Noetherian ring R, then P is contained in a unique clique, X, a subset of Spec(ü) defined below (Defin… Show more

“…If (R[t] S ) X is hereditary then (P S ) X is obviously projective. If gl.dim (R[t] S ) X = 2, then since height((P S ) X ) = 1, we get by [6,Corollary 5], that (P S ) X is projective. This implies (using the fact that a module M R is projective iff 1 ∈ MM * ) that P S is a projective R[t] S -module (from both sides).…”

Smooth polynomial identity algebras with almost factorial centers

“…If (R[t] S ) X is hereditary then (P S ) X is obviously projective. If gl.dim (R[t] S ) X = 2, then since height((P S ) X ) = 1, we get by [6,Corollary 5], that (P S ) X is projective. This implies (using the fact that a module M R is projective iff 1 ∈ MM * ) that P S is a projective R[t] S -module (from both sides).…”

Smooth polynomial identity algebras with almost factorial centers

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