Abstract
For a finitely generated module $M$, over a universally catenary local ring, whose symmetric algebra is equidimensional, the ideals generated by the rows of a minimal presentation matrix are shown to have height at most $\mu(M) - \rank M$. Moreover, in the extremal case, they are Cohen-Macaulay ideals if the symmetric algebra is Cohen-Macaulay. Some applications are given to residual intersections of ideals.
Citation
Mark R. Johnson. "Equidimensional symmetric algebras and residual intersections." Illinois J. Math. 45 (1) 187 - 193, Spring 2001. https://doi.org/10.1215/ijm/1258138262
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