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Semigroup Algebras and Maximal Orders

Published online by Cambridge University Press:  20 November 2018

Eric Jespers  and
Jan Okniński
Eric Jespers
Affiliation:
Department of Mathematics and Statistics Memorial University of Newfoundland St. John’s A1C 5S7 Newfoundland, Canada
Jan Okniński
Affiliation:
Institute of Mathematics Warsaw University Banacha 2, 02-097 Warsaw Poland
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Abstract

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We describe contracted semigroup algebras of Malcev nilpotent semigroups that are prime Noetherian maximal orders.

Keywords

16S3616H0520M25
Type
Research Article
Information
Canadian Mathematical Bulletin , Volume 42 , Issue 3 , 01 September 1999 , pp. 298 - 306
Copyright
Copyright © Canadian Mathematical Society 1999

References

[1] Anderson, D. F., The divisor class group of a semigroup ring. Comm. Algebra (5) 8 (1980), 467476.Google Scholar
[2] Brown, K. A., Height one primes of polycyclic group rings. J. London Math. Soc. Ser. 2 (3) 32 (1985), 426438.Google Scholar
[3] Chouinard, L. G. II, Krull semigroups and divisor class groups. Canad. J. Math. 23 (1981), 14591468.Google Scholar
[4] Clifford, A. H. and Preston, G. B., The Algebraic Theory of Semigroups, Vol. I. Amer. Math. Soc., Providence, RI, 1961.Google Scholar
[5] Gateva-Ivanova, T. and den Bergh, M. Van, Semigroups of I-type. J. Algebra (1) 206 (1998), 97112.Google Scholar
[6] Gilmer, R., Commutative Semigroup Rings. University of Chicago Press, 1984.Google Scholar
[7] Jespers, E. and Okniński, J., Nilpotent semigroups and semigroup algebras. J. Algebra (3) 169 (1994), 9841011.Google Scholar
[8] Jespers, E. and Okniński, J., Semigroup algebras that are principal ideal rings. J. Algebra 183 (1996), 837863.Google Scholar
[9] Jespers, E. and Okniński, J., Binomial semigroups. J. Algebra (1) 202 (1998), 250275.Google Scholar
[10] Jespers, E. and Okniński, J., Noetherian semigroup algebras. J. Algebra, to appear.Google Scholar
[11] Jespers, E. and Okniński, J., On a class of Noetherian algebras. Proc. Roy. Soc. Edinburgh Sect. A, to appear.Google Scholar
[12] Jespers, E. and Wauters, P., Principal ideal semigroup rings. Comm. Algebra 23 (1995), 50575076.Google Scholar
[13] Kargapolov, M. I. and Merzljakov, Ju. I., Fundamentals of the Theory of Groups. Springer-Verlag, New York, 1979.Google Scholar
[14] Marubayashi, H., Zhang, Y. and Yang, P., On the rings of theMorita context which are some well-known orders. Comm. Algebra (5) 26 (1998), 14291444.Google Scholar
[15] McConnell, J. C. and Robson, J. C., Noncommutative Noetherian Rings. Wiley Interscience, New York, 1987.Google Scholar
[16] Okniński, J., Semigroup Algebras. Marcel Dekker, 1991.Google Scholar
[17] Wauters, P.,On some subsemigroups of noncommutative Krull rings. Comm. Algebra (13–14) 12 (1984), 17511765.Google Scholar
[18] Wauters, P. and Jespers, E., Rings graded by an inverse semigroup with finitely many idempotents. Houston J. Math. (2) 15 (1989), 291304.Google Scholar