Finite generation of powers of ideals |
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| Authors: | Robert Gilmer William Heinzer Moshe Roitman |
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| Affiliation: | Department of Mathematics, Florida State University Tallahassee, Florida 32306-4510 ; Department of Mathematics, Purdue University, West Lafayette, Indiana 47907-1395 ; Department of Mathematics, University of Haifa, Mount Carmel, Haifa 31905, Israel |
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| Abstract: | ![]()
Suppose  is a maximal ideal of a commutative integral domain  and that some power  of  is finitely generated. We show that  is finitely generated in each of the following cases: (i)  is of height one, (ii)  is integrally closed and  , (iii) ![$R = K[X;tilde S]$](http://www.ams.org/proc/1999-127-11/S0002-9939-99-05199-0/gif-abstract/img9.gif) is a monoid domain over a field  , where  is a cancellative torsion-free monoid such that  , and  is the maximal ideal  . We extend the above results to ideals  of a reduced ring  such that  is Noetherian. We prove that a reduced ring  is Noetherian if each prime ideal of  has a power that is finitely generated. For each  with  , we establish existence of a  -dimensional integral domain having a nonfinitely generated maximal ideal  of height  such that  is  -generated. |
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| Keywords: | Cohen's theorem finite generation maximal ideal monoid ring Noetherian power of an ideal Ratliff-Rush closure |
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