The center of the total ring of fractions
Abstract
Let A be a right Ore domain, Z(A) be the center of A and Qr(A) be the right total ring of fractions of A. If K is a field and A is a K-algebra, in this short paper we prove that if A is finitely generated and GKdim(A)< GKdim(Z(A))+1, then Z(Qr(A)) Q(Z(A)). Many examples that illustrate the theorem are included, most of them within the skew PBW extensions.
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