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On multiplicative systems defined by generators and relations

I. Normal form theorems

Published online by Cambridge University Press:  24 October 2008

Trevor Evans
Affiliation:
The UniversityManchester 13

Extract

It is the purpose of this paper to study the properties of multiplicative systems, for which the associative law is not assumed, when these systems are given in terms of generators and relations. We confine ourselves mainly to loop theory, although the general theory holds also for groupoids, groupoids with division on one side, and quasigroups. Throughout the paper we are guided by two main considerations, to discover how far the concepts and results of group theory carry over to the non-associative case, and to exhibit a specific example of some of the fundamental concepts of abstract algebra. In many ways, in the general theory, we are able to obtain more complete results than in group theory. There remain, however, many interesting analogues of group theoretical concepts. It is hoped to deal with some of these in a later paper.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1951

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References

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