1. On the Directly and Subdirectly Irreducible Many-Sorted Algebras
- Author
-
Climent Vidal J. and Soliveres Tur J.
- Subjects
many-sorted algebra ,support of a many-sorted algebra ,directly irreducible many-sorted algebra ,subdirectly irreducible many-sorted algebra ,Mathematics ,QA1-939 - Abstract
A theorem of single-sorted universal algebra asserts that every finite algebra can be represented as a product of a finite family of finite directly irreducible algebras. In this article, we show that the many-sorted counterpart of the above theorem is also true, but under the condition of requiring, in the definition of directly reducible many-sorted algebra, that the supports of the factors should be included in the support of the many-sorted algebra. Moreover, we show that the theorem of Birkhoff, according to which every single-sorted algebra is isomorphic to a subdirect product of subdirectly irreducible algebras, is also true in the field of many-sorted algebras.
- Published
- 2015
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