On a Theorem of Herstein

M. Chacron

doi:10.4153/CJM-1969-148-5

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.

Throughout this paper, Z is the ring of integers, ƒ*(t) (ƒ(t)) is an integer monic (co-monic) polynomial in the indeterminate t (i.e., each coefficient of ƒ* (ƒ) is in Z and its highest (lowest) coefficient is 1 (5, p. 121, Definition) and M* (M) is the multiplicative semigroup of all integer monic (co-monic) polynomials ƒ* (ƒ) having no constant term. In (3, Theorem 2), Herstein proved that if R is a division ring with centre C such that

then R = C. In this paper we seek a generalization of Herstein's result to semi-simple rings. We also study the following condition:

(1)*

Our results are quite complete for a semi-simple ring R in which there exists a bound for the codegree ofƒ (ƒ*) (i.e., the degree of the lowest monomial of ƒ(ƒ*)) appearing in the left-hand side of (1) ((1)*).

References

1. Chacron, M., Certains anneaux périodiques, Bull. Soc. Math. Belgique 20 (1968), 66–77.Google Scholar

2. Chacron, M., On quasi periodic rings, J. Algebra 12 (1969), 49–60.Google Scholar

3. Herstein, I. N., The structure of a certain class of rings, Amer. J. Math. 75 (1953), 866–871.Google Scholar

4. Herstein, I. N., Anoie on rings with central nilpotent elements, Proc. Amer. Math. Soc. 5 (1954), 620.Google Scholar

5. Herstein, I. N., Topics in algebra (Blaisdell, Waltham, Massachusetts, 1964).Google Scholar

6. Herstein, I. N., Topics in ring theory, Mathematics Lecture Notes, University of Chicago, Chicago, Illinois, 1965.Google Scholar

7. Rosenberg, A. and Zelinsky, D., On Nakayama1 s extensions of the xn(-x) theorems, Proc. Amer. Math. Soc. 5 (1954), 484–486.Google Scholar

8. Thierrin, G., Extensions radicales et quasi-radicales dans les anneaux, Can. Math. Bull. 5 (1962), 29–35.Google Scholar

9. Utumi, Y., On brings, Osaka Math. J. 33 (1957), 63–65.Google Scholar

Crossref Citations

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

Chacron, M 1970. On a theorem of Procesi. Journal of Algebra, Vol. 15, Issue. 2, p. 225.

Bell, H. E. 1975. Some commutativity results for rings with two-variable constraints. Proceedings of the American Mathematical Society, Vol. 53, Issue. 2, p. 280.

Chacron, M. 1976. A commutativity theorem for rings. Proceedings of the American Mathematical Society, Vol. 59, Issue. 2, p. 211.

Bell, Howard E. 1977. A Commutativity Theorem for Near-Rings. Canadian Mathematical Bulletin, Vol. 20, Issue. 1, p. 25.

Chacron, M 1977. Algebraic Φ-rings extensions of bounded index. Journal of Algebra, Vol. 44, Issue. 2, p. 370.

Richoux, Anthony 1980. A Commutativity Theorem for Division Rings. Canadian Mathematical Bulletin, Vol. 23, Issue. 2, p. 241.

Bell, H. E. 1980. On commutativity of periodic rings and near-rings. Acta Mathematica Academiae Scientiarum Hungaricae, Vol. 36, Issue. 3-4, p. 293.

Bell, Howard E. 1981. On quasi-periodic rings. Archiv der Mathematik, Vol. 36, Issue. 1, p. 502.

McKenzie, Ralph 1982. Residually small varieties ofK-algebras. Algebra Universalis, Vol. 14, Issue. 1, p. 181.

Cherubini, A. and Varisco, A. 1986. Rings satisfying certain conditions either on subsemigroups or on endomorphisms. Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics, Vol. 40, Issue. 2, p. 194.

Bell, Howard E. Janjić, Milan and Psomopoulos, Evagelos 1990. On Rings with Powers Commuting on Subsets. Results in Mathematics, Vol. 18, Issue. 1-2, p. 1.

Hirano, Yasuyuki 1991. Some characterizations of π-regular rings with no infinite trivial subring. Proceedings of the Edinburgh Mathematical Society, Vol. 34, Issue. 1, p. 1.

Bell, Howard E. and Klein, Abraham A. 1992. On rings with engel cycles, II. Results in Mathematics, Vol. 21, Issue. 3-4, p. 265.

Bell, Howard E. 1994. ON PSEUDO-COMMUTATMTY AND COMMUTATIVITY IN RINGS. Quaestiones Mathematicae, Vol. 17, Issue. 2, p. 173.

Spiegel, Eugene 1999. Algebraic radicals and incidence algebras. Journal of Discrete Mathematical Sciences and Cryptography, Vol. 2, Issue. 2-3, p. 197.

Bell*, Howard E. and Klein, Abraham A. 2001. COMBINATORIAL COMMUTATIVITY AND FINITENESS CONDITIONS FOR RINGS. Communications in Algebra, Vol. 29, Issue. 7, p. 2935.

Bell, Howard E. 2002. A Near-Commutativity Property for Rings. Results in Mathematics, Vol. 42, Issue. 1-2, p. 28.

Bell, Howard E. and Klein, Abraham A. 2008. Extremely noncommutative elements in rings. Monatshefte für Mathematik, Vol. 153, Issue. 1, p. 19.

Bell, H. E. and Klein, A. A. 2009. On almost-quasi-commutative rings. Acta Mathematica Hungarica, Vol. 122, Issue. 1-2, p. 121.

Chen, Huanyin Kose, Handan and Kurtulmaz, Yosum 2014. EXTENSIONS OF STRONGLY π-REGULAR RINGS. Bulletin of the Korean Mathematical Society, Vol. 51, Issue. 2, p. 555.

Download full list

Article contents

On a Theorem of Herstein

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