The core of an ideal in Cohen-Macaulay rings

Christine Cumming

doi:10.1216/JCA-2018-10-2-163

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Home > Journals > J. Commut. Algebra > Volume 10 > Issue 2 > Article

2018 The core of an ideal in Cohen-Macaulay rings

Christine Cumming

J. Commut. Algebra 10(2): 163-170 (2018). DOI: 10.1216/JCA-2018-10-2-163

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Abstract

The core of an ideal $I$ is the intersection of all reductions of $I$. We prove that the core behaves well under extension to the trivial extension. Also, we describe the core as a colon ideal of a power of any reduction and a power $I$, for a class of ideals $I$ in Cohen-Macaulay rings.

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Christine Cumming. "The core of an ideal in Cohen-Macaulay rings." J. Commut. Algebra 10 (2) 163 - 170, 2018. https://doi.org/10.1216/JCA-2018-10-2-163