When the dual of an ideal is a ring |
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| Authors: | James A. Huckaba Ira J. Papick |
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| Affiliation: | (1) Department of Mathematics, University of Missouri, 65211 Columbia, Missouri |
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| Abstract: | Let R be a commutative integral domain with identity with quotient field K, and let I be a nonzero ideal of R. We analyze several general and particular instances when I–1 is a subring of K. We then apply some of our results to show that certain non-maximal prime ideals in Prüfer domains are divisorial. |
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