Modular Annihilator Algebras

Bruce A. Barnes

doi:10.4153/CJM-1966-055-6

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In a recent paper (7) Yood developed the beginnings of a theory of modular annihilator algebras. In this paper we extend his work on these algebras.

The definition of modular annihilator algebra is algebraic in nature (see §4) ; in fact the algebra need not be assumed even topological. However, a significant number of important normed algebras are modular annihilator algebras. A list of examples is given in §8.

The theory of modular annihilator algebras is related to the theory of certain important topological algebras. In §5 we consider the relationships between dual and annihilator algebras and modular annihilator algebras, and in §7, the relationship between completely continuous normed algebras and modular annihilator algebras.

References

1. Artin, E., Nesbitt, C., and Thrall, R., Rings with minimum condition (Ann Arbor, 1944).Google Scholar

2. Barnes, B. A., Modular annihilator algebras, Doctoral Thesis, Cornell University (1964).Google Scholar

3. Freundlich, M., Completely continuous elements of a normed ring, Duke Math. J., 16 (1949), 273–283.Google Scholar

4. Kaplansky, I., Normed algebras, Duke Math. J., 16 (1949), 399–418.Google Scholar

5. Rickart, C., Banach algebras (Princeton, 1960).Google Scholar

6. Taylor, A. E., Introduction to functional analysis (New York, 1958).Google Scholar

7. Yood, B., Ideals in topological rings, Can. J. Math., 16 (1964), 28–45.Google Scholar

Crossref Citations

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

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