Word-Representable Graphs and Locality of Words
Abstract
In this work, we investigate the relationship between k-repre\-sentable graphs and graphs representable by k-local words. In particular, we show that every graph representable by a k-local word is (k+1)-representable. A previous result about graphs represented by 1-local words is revisited with new insights. Moreover, we investigate both classes of graphs w.r.t. hereditary and in particular the speed as a measure. We prove that the latter ones belong to the factorial layer and that the graphs in this classes have bounded clique-width.
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