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Program Systems: Theory and Applications, 2015, Volume 6, Issue 3, Pages 45–52
(Mi ps176)
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Hardware, software and distributed supercomputer systems
To the completion of a groupoid to a programm algebra
A. A. Demidov
Ailamazyan Program Systems Institute of RAS
Abstract:
The task of embedding of a finite groupoid into a finite programm algebra has a practical significance for the conversion of algorithm into a form suitable for computation on algebraic processor. It was posed and solved by N. N. Nepeivoda for semigroups, then he has proposed a method of embedding of a groupoid into a infinite programm algebra. In this paper we construct an embedding of a finite groupoid into a finite programm algebra, which completes the solution of the problem. (In Russian).
Key words and phrases:
algebras, algebraic computations, groupoid embedding.
Received: 05.09.2015
Accepted: 30.09.2015
Citation:
A. A. Demidov, “To the completion of a groupoid to a programm algebra”, Program Systems: Theory and Applications, 6:3 (2015), 45–52
Linking options:
https://www.mathnet.ru/eng/ps176 https://www.mathnet.ru/eng/ps/v6/i3/p45
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| Abstract page: | 160 | | Full-text PDF : | 48 | | References: | 22 |
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