Abstract
ABSTRACTAn extension of algebras is a homomorphism of algebras preserving identities. Given an extension f:B→A, the relative global dimension of f is defined to be the supremum of relative projective dimensions of all A-modules. In this paper, we compare relative homological dimensions of two extensions of ordinary algebras under certain conditions. As an application, for any natural number n, we present a general method for constructing non-trivial extensions of Artin algebras of relative global dimension at least n.
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