On a class of Gorenstein ideals of grade four (Q2925929)

If \(I\) and \(J\) are geometrically linked perfect ideals of grade \(g\) in the commutative Noetherian ring \(R\), then \(I+J\) is a grade \(g+1\) Gorenstein ideal in \(R\); see, for example, [\textit{B. Ulrich}, Trans. Am. Math. Soc. 318, No. 1, 1--42 (1990; Zbl 0694.13014)]. If the resolution of \(R/I\) by free \(R\)-modules is \(\mathbb F\), then \(\mathbb F^*[-g]\) is a resolution of \(J/(I\cap J)\) and the natural inclusion of \(J/(I\cap J) \hookrightarrow R/I\) induces a map of complexes \(\alpha: \mathbb F^*[-g] \to \mathbb F\). The mapping cone of \(\alpha\) is a resolution of \(R/(I+J)\). In the present paper, the above construction is applied to a few classes of grade three perfect ideals \(I\).