On the Chain Problem of Prime Ideals

Masayoshi Nagata

doi:10.1017/S0027763000000076

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

There is a problem called the chain problem of prime ideals, which asks, when 0 is a Noetherian local integral domain, whether the length of an arbitrary maximal chain of prime ideals in 0 is equal to rank 0 or not.

References

[ 1 ] Oka, K., Sur les fonctions analytiques de plusieurs variables, VIII-Lemme fondamental, J. of Math. Soc. of Japan, vol. 3 (1951), pp. 204–214.Google Scholar

[ 2 ] Nagata, M., Some remarks on local rings, Nagoya Math. J., vol. 6 (1953), pp. 53–58.CrossRef Google Scholar

[2, II] Nagata, M., Some remarks on local rings, II, Memoirs Kyoto Univ., ser. A, vol. 28, No. 2 (1954), pp. 109–120.Google Scholar

[ 3 ] Nagata, M., Basic theorems on general commutative rings, Memoirs Kyoto Univ., ser. A, vol. 29, No. 1 (1955), pp. 59–77.Google Scholar

[ 4 ] Nagata, M., A general theory of algebraic geometry over Dedekind domains, I, Amer. J. of Math., vol. 78, No. 1 (1956), pp. 78–116.CrossRef Google Scholar

[ 5 ] Nagata, M., The theory of multiplicity in general local rings, forthcoming.Google Scholar

[ 6 ] Nagata, M., The derived normal rings of Noetherian integral domains, Memoirs Kyoto Univ., ser. A, vol. 29, No. 3 (1955), pp. 293–303.Google Scholar

[ 7 ] Serre, J. P., Sur la dimension homologique des anneaux et des modules noethériens, forthcoming.Google Scholar

[ 8 ] Zariski, O., Analytical irreducibility of normal varieties, Ann. of Math., vol. 49 (1948), pp. 352–361.Google Scholar

[ 9 ] Zariski, O., Sur la normalité analytique des variété normales, Ann. L’inst. Fourier, vol. 2 (1950), pp. 161–164.Google Scholar

Crossref Citations

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

Rees, D. 1961. a-Transforms of Local Rings and a Theorem on Multiplicities of Ideals. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 57, Issue. 1, p. 8.

1964. Vol. 14, Issue. , p. 471.

CrossRef

1971. Vol. 43, Issue. , p. 266.

CrossRef

Ratliff, Louis J. 1973. Conference on Commutative Algebra. Vol. 311, Issue. , p. 222.

Sawtelle, Peter G. 1973. Quasi-unmixed local rings and quasi-subspaces. Proceedings of the American Mathematical Society, Vol. 38, Issue. 1, p. 59.

Brodmann, Markus 1975. Ueber die minimale Dimension der assoziierten Primideale der Komplettion eines lokalen Integritätsbereiches. Commentarii Mathematici Helvetici, Vol. 50, Issue. 1, p. 219.

Ratliff, L. J. 1976. Maximal chains of prime ideals in integral extension domains. II. Transactions of the American Mathematical Society, Vol. 224, Issue. 1, p. 117.

Sawtelle, Peter G. 1976. Quasi-unmixedness and integral closure of Rees rings. Proceedings of the American Mathematical Society, Vol. 56, Issue. 1, p. 95.

Ratliff, L. J. and McAdam, S. 1976. Maximal chains of prime ideals in integral extension domains. I. Transactions of the American Mathematical Society, Vol. 224, Issue. 1, p. 103.

Brodmann, Markus 1977. A “Macaulayfication” of unmixed domains. Journal of Algebra, Vol. 44, Issue. 1, p. 221.

Brodmann, Markus 1978. A particular class of regular domains. Journal of Algebra, Vol. 54, Issue. 2, p. 366.

Pettit, M. Edward 1979. Properties ofH i-Rings. Annali di Matematica Pura ed Applicata, Vol. 121, Issue. 1, p. 1.

Brodmann, Markus P 1980. Finiteness of ideal transforms. Journal of Algebra, Vol. 63, Issue. 1, p. 162.

OGOMA, Tetsushi 1980. Non-catenary pseudo-geometric normal rings. Japanese journal of mathematics. New series, Vol. 6, Issue. 1, p. 147.

de Souza Doering, Ada Maria and Lequain, Yves 1980. The gluing of maximal ideals—spectrum of a Noetherian ring—going up and going down in polynomial rings. Transactions of the American Mathematical Society, Vol. 260, Issue. 2, p. 583.

de Souza Doering, Ada Maria 1980. Chains of prime ideals in Noetherian domains. Journal of Pure and Applied Algebra, Vol. 18, Issue. 1, p. 97.

Ratliff, L. J. 1981. A Brief History and Survey of the Catenary Chain Conjectures. The American Mathematical Monthly, Vol. 88, Issue. 3, p. 169.

Ratliff, L.J 1981. Independent elements, integrally closed ideals, and quasi-unmixedness. Journal of Algebra, Vol. 73, Issue. 2, p. 327.

Small, Lance W. and Wadsworth, Adrian R. 1981. Some examples op rings. Communications in Algebra, Vol. 9, Issue. 10, p. 1105.

Ratliff, L.J 1982. New characterizations of quasi-unmixed, unmixed, and Macaulay local domains. Journal of Algebra, Vol. 74, Issue. 2, p. 302.

Download full list

Article contents

On the Chain Problem of Prime Ideals

Extract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests