Gorenstein properties of simple gluing algebras
Abstract
Let A=KQA/IA and B=KQB/IB be two finite-dimensional bound quiver algebras, fix two vertices a∈ QA and b∈ QB. We define an algebra =KQ/I, which is called a simple gluing algebra of A and B, where Q is from QA and QB by identifying a and b, I= IA,IB. We prove that is Gorenstein if and only if A and B are Gorenstein, and describe the Gorenstein projective modules, singularity category, Gorenstein defect category and also Cohen-Macaulay Auslander algebra of from the corresponding ones of A and B.
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