Jui-Yi Kao, Narad Rampersad, Jeffrey Shallit, Manuel Silva
Published 2006-08-24, updated 2006-09-12Version 2
Carpi constructed an infinite word over a 4-letter alphabet that avoids squares in all subsequences indexed by arithmetic progressions of odd difference. We show a connection between Carpi's construction and the paperfolding words. We extend Carpi's result by constructing uncountably many words that avoid squares in arithmetic progressions of odd difference. We also construct infinite words avoiding overlaps and infinite words avoiding arbitrarily large squares in arithmetic progressions of odd difference. We use these words to construct labelings of the 2-dimensional integer lattice such that any line through the lattice encounters a squarefree (resp. overlapfree) sequence of labels.
Comments: 18 pages; Manuel Silva added as a co-author
On non-repetitive sequences of arithmetic progressions:the cases $k \in \{4,5,6,7,8\}$
A Distributive Lattice Connected with Arithmetic Progressions of Length Three
The lattice of arithmetic progressions
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