Determinism in Multi-Soliton Automata

Henning Bordihn
(University of Potsdam, Institute of Computer Science)
Helena Schulz

Soliton automata are mathematical models of soliton switching in chemical molecules. Several concepts of determinism for soliton automata have been defined. The concept of strong determinism has been investigated for the case in which only a single soliton can be present in a molecule. In the present paper, several different concepts of determinism are explored for the multi-soliton case. It is shown that the degree of non-determinism is a connected measure of descriptional complexity for multi-soliton automata. A characterization of the class of strongly deterministic multi-soliton automata is presented. Finally, the concept of perfect determinism, forming a natural extension of strong determinism, is introduced and considered for multi-soliton automata.

In Florin Manea and Giovanni Pighizzini: Proceedings 14th International Workshop on Non-Classical Models of Automata and Applications (NCMA 2024), Göttingen, Germany, 12-13 August 2024, Electronic Proceedings in Theoretical Computer Science 407, pp. 44–58.
Published: 11th September 2024.

ArXived at: https://dx.doi.org/10.4204/EPTCS.407.4 bibtex PDF
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