Subrings of Generated by Monomials

David F. Anderson

doi:10.4153/CJM-1978-019-5

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In this paper we study subrings A of generated by monomials over . If A is normal and A ⊂ B integral, we can completely characterize A. If dim A = 2, we show that A is isomorphic to a subring A’ of B generated by monomials with A’ ⊂ B integral. The author became interested in these rings while studying projective modules over subrings of , For some applications, see [1].

References

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6. Swan, R. G., Algebraic K-theory, Lecture notes in mathematics 76 (Springer, Berlin, 1968).Google Scholar

7. Waterhouse, W. C., Divisor classes in pseudo Galois extensions, Pac. J. Math. 36 (1971), 541–548.Google Scholar

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Subrings of Generated by Monomials

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