Decimation and Interleaving Operations in One-Sided Symbolic Dynamics
Abstract
This paper studies subsets of one-sided shift spaces on a finite alphabet. Such subsets arise in symbolic dynamics, in fractal constructions, and in number theory. We study a family of decimation operations, which extract subsequences of symbol sequences in infinite arithmetic progressions, and show they are closed under composition. We also study a family of -ary interleaving operations, one for each . Given subsets of the shift space, the -ary interleaving operator produces a set whose elements combine individual elements , one from each , by interleaving their symbol sequences cyclically in arithmetic progressions . We determine algebraic relations between decimation and interleaving operators and the shift operator. We study set-theoretic -fold closure operations , which interleave decimations of of modulus level . A set is -factorizable if . The -fold interleaving operators are closed under composition and are idempotent. To each we assign the set of all values for which . We characterize the possible sets as nonempty sets of positive integers that form a distributive lattice under the divisibility partial order and are downward closed under divisibility. We show that all sets of this type occur. We introduce a class of weakly shift-stable sets and show that this class is closed under all decimation, interleaving, and shift operations. This class includes all shift-invariant sets. We study two notions of entropy for subsets of the full one-sided shift and show that they coincide for weakly shift-stable , but can be different in general. We give a formula for entropy of interleavings of weakly shift-stable sets in terms of individual entropies.
Keywords
Cite
@article{arxiv.2010.15215,
title = {Decimation and Interleaving Operations in One-Sided Symbolic Dynamics},
author = {William C. Abram and Jeffrey C. Lagarias and Daniel J. Slonim},
journal= {arXiv preprint arXiv:2010.15215},
year = {2022}
}
Comments
41 pages, 2 figures