Idealizations of pseudo Buchsbaum modules over a pseudo Buchsbaum ring (Q2872991)

Let \(A\) be a Noetherian local ring with maximal ideal \({m}\) and \(M\) a finitely generated \(A\)-module of dimension \(d\). Then the idealization of \(M\) over \(A\) is defined to be the commutative local ring made from the cartesian product \(A \times M\) by defining the componentwise addition and the multiplication as follow: NEWLINE\[NEWLINE(a,x)(b,y)=(ab, ay+bx)NEWLINE\]NEWLINE Let \(\underline a =(a_1, \cdots, a_d)\) be a system of parameter of \(M\). Define NEWLINE\[NEWLINEQ_M (\underline a)=\displaystyle \bigcup_{t >0}(a_1^{t+1}, \cdots, a_d^{t+1})M:_Ma_1^t \cdots a_d^tNEWLINE\]NEWLINE and NEWLINE\[NEWLINEJ_M (\underline a) = e_0(\underline a; M)- l(M/Q_M(\underline a))NEWLINE\]NEWLINE \(J_M (\underline a)\) compares the multiplicity \(e_0(\underline a; M)\) of \(M\) with respect to \(\underline{a}\) and the length of \(M/Q_M(\underline a)\). \(M\) is called pseudo Buchsbaum if \(J_M (\underline a)\) is a constant \(C\) independent of \(\underline{a}\). The notion of pseudo Buchsbaum modules was introduced in 2004 by \textit{N. T. Cuong} and \textit{N. T. H. Loan} [Jap. J. Math., New Ser. 30, No. 1, 165--181 (2004; Zbl 1058.13013)].NEWLINENEWLINE The authors of the present paper give conditions for which the idealization \(A \times M\) of \(M\) over a pseudo Buchsbaum ring \(A\), is pseudo-Buchsbaum.