Add to ORKGA vertex coloring of a graph is nonrepetitive if there is no path in the graph whose first half receives the same sequence of colors as the second half. While every tree can be nonrepetitively colored with a bounded number of colors (4 colors is enough), Fiorenzi, Ochem, Ossona de Mendez, and Zhu recently showed that this does not extend to the list version of the problem, that is, for every ℓ ≥ 1 there is a tree that is not nonrepetitively ℓ-choosable. In this paper we prove the following positive result, which complements the result of Fiorenzi et al. There exists a function f such that every tree of pathwidth k is nonrepetitively f (k)-choosable. We also show that such a property is specific to trees by constructing a family of pathwidth...
A vertex colouring of a graph is nonrepetitive if there is no path for which the first half of the p...
A vertex coloring of a graph $G$ is $k \textit{-nonrepetitive}$ if one cannot find a periodic sequen...
The k-Coloring problem is to decide whether a graph can be colored with at most k colors such that n...
A vertex colouring of a graph is nonrepetitive if there is no path whose first half receives the sam...
A vertex colouring of a graph is nonrepetitive if there is no path whose first half receives the sam...
A vertex colouring of a graph G is nonrepetitive if for any path P = (v1, v2,..., v2r) in G, the fir...
International audienceA vertex colouring of a graph G is nonrepetitive if for any path $P = (v_1, v_...
A coloring c of the vertices of a graph G is nonrepetitive if there exists no path v1v2... v2l for w...
International audienceA vertex colouring of a graph G is nonrepetitive if for any path $P = (v_1, v_...
International audienceA vertex colouring of a graph G is nonrepetitive if for any path $P = (v_1, v_...
A vertex coloring f of a graph G is nonrepetitive if there are no integer r ≥ 1 and a simple path v1...
AbstractA coloring of a graph is nonrepetitive if the graph contains no path that has a color patter...
A sequence S = s1s2:::s2n is called a repetition if si = sn+i for each i = 1;:::; n. A coloring of t...
The k-Coloring problem is to decide whether a graph can be colored with at most k colors such that n...
A colouring of a graph is "nonrepetitive" if for every path of even order, the sequence of colours o...
A vertex colouring of a graph is nonrepetitive if there is no path for which the first half of the p...
A vertex coloring of a graph $G$ is $k \textit{-nonrepetitive}$ if one cannot find a periodic sequen...
The k-Coloring problem is to decide whether a graph can be colored with at most k colors such that n...
A vertex colouring of a graph is nonrepetitive if there is no path whose first half receives the sam...
A vertex colouring of a graph is nonrepetitive if there is no path whose first half receives the sam...
A vertex colouring of a graph G is nonrepetitive if for any path P = (v1, v2,..., v2r) in G, the fir...
International audienceA vertex colouring of a graph G is nonrepetitive if for any path $P = (v_1, v_...
A coloring c of the vertices of a graph G is nonrepetitive if there exists no path v1v2... v2l for w...
International audienceA vertex colouring of a graph G is nonrepetitive if for any path $P = (v_1, v_...
International audienceA vertex colouring of a graph G is nonrepetitive if for any path $P = (v_1, v_...
A vertex coloring f of a graph G is nonrepetitive if there are no integer r ≥ 1 and a simple path v1...
AbstractA coloring of a graph is nonrepetitive if the graph contains no path that has a color patter...
A sequence S = s1s2:::s2n is called a repetition if si = sn+i for each i = 1;:::; n. A coloring of t...
The k-Coloring problem is to decide whether a graph can be colored with at most k colors such that n...
A colouring of a graph is "nonrepetitive" if for every path of even order, the sequence of colours o...
A vertex colouring of a graph is nonrepetitive if there is no path for which the first half of the p...
A vertex coloring of a graph $G$ is $k \textit{-nonrepetitive}$ if one cannot find a periodic sequen...
The k-Coloring problem is to decide whether a graph can be colored with at most k colors such that n...