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Block Maps between Primitive Uniform and Pisot Substitutions

Published 2013-06-17, updated 2014-03-17Version 4

In this article, we prove that for all pairs of primitive Pisot or uniform substitutions with the same dominating eigenvalue, there exists a finite set of block maps such that every block map between the corresponding subshifts is an element of this set, up to a shift.

Comments: 21 pages. Minor corrections to grammar and some proofs. To appear in Ergodic Theory and Dynamical Systems after editorial input by Cambridge University Press. Copyright held by Cambridge University Press

DOI: 10.1017/etds.2014.29

Categories: math.DS, cs.FL

Keywords: block map, pisot substitutions, primitive uniform, finite set, uniform substitutions

Tags: journal article

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Block Maps between Primitive Uniform and Pisot Substitutions

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Block Maps between Primitive Uniform and Pisot Substitutions

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arXiv:1306.3777 [math.DS]Abstract References Reviews Resources