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Communications in Algebra Volume 46, 2018 - Issue 8
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Original Articles

Certain towers of ramified minimal ring extensions of commutative rings

David E. DobbsDepartment of Mathematics, University of Tennessee, Knoxville, Tennessee, USACorrespondence[email protected]
ORCID Iconhttp://orcid.org/0000-0002-5496-9453
ORCID Icon
Pages 3461-3495 | Received 24 Jul 2016, Published online: 17 Jan 2018

References

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  • Dobbs, D. E. (2006). Every commutative ring has a minimal ring extension. Commun. Algebra 34:3875–3881.
  • Dobbs, D. E. (2017). When the juxtaposition of two minimal ring extensions produces no new intermediate rings. Pales. J. Math. 6(1):31–44. Corrigendum, Pales. J. Math. 7(1) (2018), 32–34.
  • Dobbs, D. E. (2016). On the commutative rings with at most two proper subrings. Int. J. Math. Math. Sci. 2016:Article ID 6912360, 13 pp.. doi:10.1155/2016/6912360.
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  • Dobbs, D. E., Shapiro, J. (2016). When only finitely many intermediate rings result from juxtaposing two minimal ring extensions. Pales. J. Math. 5(Spec1):13–31.
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