Title of article
Turing Automata and Graph Machines
Author/Authors
Miklos Bartha، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
13
From page
19
To page
31
Abstract
Indexed monoidal algebras are introduced as an equivalent structure for self-dual compact closed categories, and a coherence theorem is proved for the category of such algebras. Turing automata and Turing graph machines are defined by generalizing the classical Turing machine concept, so that the collection of such machines becomes an indexed monoidal algebra. On the analogy of the von Neumann data-flow computer architecture, Turing graph machines are proposed as potentially reversible low-level universal computational devices, and a truly reversible molecular size hardware model is presented as an example.
Journal title
Electronic Proceedings in Theoretical Computer Science
Serial Year
2010
Journal title
Electronic Proceedings in Theoretical Computer Science
Record number
679886
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