Geodesic
Grasshopper avoidance of patterns
Michał Dębski1 ; Urszula Pastwa1 ; Krzysztof Węsek1
1Warsaw University of Technology
The electronic journal of combinatorics, Tome 23 (2016) no. 4
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Motivated by a geometrical Thue-type problem, we introduce a new variant of the classical pattern avoidance in words, where jumping over a letter in the pattern occurrence is allowed. We say that pattern $p\in E^+$ occurs with jumps in a word $w=a_1a_2\ldots a_k \in A^+$, if there exist a non-erasing morphism $f$ from $E^*$ to $A^*$ and a sequence $(i_1, i_2, \ldots , i_l)$ satisfying $i_{j+1}\in\{ i_j+1, i_j+2 \}$ for $j=1, 2, \ldots, l-1$, such that $f(p) = a_{i_1}a_{i_2}\ldots a_{i_l}.$ For example, a pattern $xx$ occurs with jumps in a word $abdcadbc$ (for $x \mapsto abc$). A pattern $p$ is grasshopper $k$-avoidable if there exists an alphabet $A$ of $k$ elements, such that there exist arbitrarily long words over $A$ in which $p$ does not occur with jumps. The minimal such $k$ is the grasshopper avoidability index of $p$. It appears that this notion is related to two other problems: pattern avoidance on graphs and pattern-free colorings of the Euclidean plane. In particular, we show that a sequence avoiding a pattern $p$ with jumps can be a tool to construct a line $p$-free coloring of $\mathbb{R}^2$. In our work, we determine the grasshopper avoidability index of patterns $\alpha^n$ for all $n$ except $n=5$. We also show that every doubled pattern is grasshopper $(2^7+1)$-avoidable, every pattern on $k$ variables of length at least $2^k$ is grasshopper $37$-avoidable, and there exists a constant $c$ such that every pattern of length at least $c$ on $2$ variables is grasshopper $3$-avoidable (those results are proved using the entropy compression method).
DOI : 10.37236/6210
Classification : 05A05, 68R15
Mots-clés : Thue sequence, avoidable pattern, entropy compression

Michał Dębski  1   ; Urszula Pastwa  1   ; Krzysztof Węsek  1

1 Warsaw University of Technology 
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     author = {Micha{\l} D\k{e}bski and Urszula Pastwa and Krzysztof W\k{e}sek},
     title = {Grasshopper avoidance of patterns},
     journal = {The electronic journal of combinatorics},
     year = {2016},
     volume = {23},
     number = {4},
     doi = {10.37236/6210},
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Michał Dębski; Urszula Pastwa; Krzysztof Węsek. Grasshopper avoidance of patterns. The electronic journal of combinatorics, Tome 23 (2016) no. 4. doi: 10.37236/6210

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