Authors: Fahad Alsharari, Mohd Salmi Md Noorani

Abstract:

A Motzkin shift is a mathematical model for constraints on genetic sequences. In terms of the theory of symbolic dynamics, the Motzkin shift is nonsofic, and therefore, we cannot use the Perron- Frobenius theory to calculate its topological entropy. The Motzkin shift M(M,N) which comes from language theory, is defined to be the shift system over an alphabet A that consists of N negative symbols, N positive symbols and M neutral symbols. For an x in the full shift, x will be in the Motzkin subshift M(M,N) if and only if every finite block appearing in x has a non-zero reduced form. Therefore, the constraint for x cannot be bounded in length. K. Inoue has shown that the entropy of the Motzkin shift M(M,N) is log(M + N + 1). In this paper, a new direct method of calculating the topological entropy of the Motzkin shift is given without any measure theoretical discussion.

Keywords: Motzkin shift, topological entropy.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1338102

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References:

[1] D. Lind and B. Marcus, An Introduction to Symbolic Dynamics and Coding, Cambridge Univ. Press, 1995.
[2] K. Inoue, The Zeta function, Periodic Points and Entropies of the Motzkin Shift, arXiv:math/0602100v3, (math.DS), 2006.
[3] P. B. Kitchens, Symbolic Dynamics. One-sided, two-sided and countable state Markov shifts, Berlin: Universitext, Springer-Verlag, 1998.
[4] Z. H. Nitecki, Topological entropy and the preimage structure of maps, Real Analysis Exchange, pp 9-42, 2003/2004.
[5] W. Krieger, On the uniqeness of equilibrium state, Mathematical system theory, Vol. 8, pp 97-104. 1974.