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

1. Anderson, D. F., Projective modules over subrings of k[X, Y] generated by monomials, (submitted).Google Scholar

2. Bass, H., Algebraic K-theory (W. A. , New York, 1968).Google Scholar

3. Possum, R., The divisor class group of a Krull domain (Springer-Verlag, New York, 1973).Google Scholar

4. Hochster, M., Rings of invariants of tori, Cohen-AIacaulay rings generated by monomials, and poly topes, Ann. of Math. 96 (1972), 318–337.Google Scholar

5. Samuel, P., Unique factorization domains (Lecture notes), Tata Institute, Bombay; 1964.Google Scholar

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

Crossref Citations

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

Anderson, David F. 1980. The divisor class group of a semigroup ring. Communications in Algebra, Vol. 8, Issue. 5, p. 467.

Wajnryb, Bronislaw 1982. Finiteness conditions in Krull subrings of a ring of polynomials. Israel Journal of Mathematics, Vol. 43, Issue. 2, p. 169.

Goto, Shiro and Shimoda, Yasuhiro 1983. On the Gorensteinness of Rees and form rings of almost complete intersections. Nagoya Mathematical Journal, Vol. 92, Issue. , p. 69.

Glaz, Sarah 1988. Factriality and finiteness properties of subalgebras over which is faithfully flat. Communications in Algebra, Vol. 16, Issue. 9, p. 1791.

Ford, Timothy J 1989. On the Brauer group of k[x1, …, xn, 1f]. Journal of Algebra, Vol. 122, Issue. 2, p. 410.

Gurjar, R V 1989. Graded subrings of ℂ[X, Y]. Proceedings of the Indian Academy of Sciences - Section A, Vol. 99, Issue. 3,

Anderson, D.D. and Anderson, David F. 1992. Elasticity of factorizations in integral domains. Journal of Pure and Applied Algebra, Vol. 80, Issue. 3, p. 217.

Gurjar, R. V. and Simha, R. R. 1992. Some results on the topology of varieties dominated by C n. Mathematische Zeitschrift, Vol. 211, Issue. 1, p. 333.

Gubeladze, Joseph 1995. Nontriviality of SK1(R[M]). Journal of Pure and Applied Algebra, Vol. 104, Issue. 2, p. 169.

Gubeladze, Joseph 1995. The isomorphism problem for monoid rings of rank 2 monoids. Journal of Pure and Applied Algebra, Vol. 105, Issue. 1, p. 17.

Nascimento, Mauri C. 1997. Nonfiniteness in finite class group. Communications in Algebra, Vol. 25, Issue. 7, p. 2105.

Kim, Hwankoo and Park, Young Soo 2001. Krull Domains of Generalized Power Series. Journal of Algebra, Vol. 237, Issue. 1, p. 292.

Kim, Hwankoo and Moon, SangJae 2001. Information Security and Privacy. Vol. 2119, Issue. , p. 74.

Yun, Aaram Kim, Jaeheon and Lee, Dong Hoon 2004. Algorithmic Number Theory. Vol. 3076, Issue. , p. 442.

Lam, Tsit Yuen 2006. Serre’s Problem on Projective Modules. p. 363.

El-Baghdadi, Said and Kim, Hwankoo 2016. Generalized Krull Semigroup Rings. Communications in Algebra, Vol. 44, Issue. 4, p. 1783.

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Subrings of Generated by Monomials

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