Cohen-Macaulay and Gorenstein Properties of Bi-Amalgamated Algebras with Applications to Algebroid Curves
Abstract
Let A f,g (J,J') be the bi--amalgamation of a commutative ring A with (B,C) along the ideals (J,J') with respect to the ring homomorphisms (f,g). In this article, we study the basic homological properties of the bi--amalgamated algebra construction. We first calculate the dimension and depth of the bi--amalgamated algebra under fairly general circumstances and derive necessary and sufficient conditions for Cohen--Macaulayness in terms of maximal and big Cohen--Macaulay modules of A. Furthermore, we characterize the Gorenstein property of the bi--amalgamated algebra through the canonical modules of f(A)+J and g(A)+J'. We apply our results to the theory of curve singularities by constructing Gorenstein algebroid curves through bi--amalgamated and amalgamated algebras. We also give a brief remark concerning the universally catenary property of Af,g(J,J').
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