Examples in finite Gel′fand-Kirillov dimension
نویسنده
چکیده
Abstract By modifying constructions of Bĕıdar and Small we prove that for countably generated prime F -algebras of finite GK dimension there exists an affinization having finite GK dimension. Using this result we show: for any field there exists a prime affine algebra of GK dimension two that is neither primitive nor PI; for any countable field F there exists a prime affine F -algebra of GK dimension three that has nonnil Jacobson radical; for any countable field F there exists an affine primitive F -algebra of GK dimension at most four with center equal to a polynomial ring; for a countable field F there exists a primitive affine Jacobson F -algebra of GK dimension three that does not satisfy the Nullstellensatz.
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