Polynomial Treedepth Bounds in Linear Colorings
Polynomial Treedepth Bounds in Linear Colorings
Autor
Punktacja ministerialna
70
Data publikacji
Abstrakt (EN)
Low-treedepth colorings are an important tool for algorithms that exploit structure in classes of bounded expansion; they guarantee subgraphs that use few colors have bounded treedepth. These colorings have an implicit tradeoff between the total number of colors used and the treedepth bound, and prior empirical work suggests that the former dominates the run time of existing algorithms in practice. We introduce p-linear colorings as an alternative to the commonly used p-centered colorings. They can be efficiently computed in bounded expansion classes and use at most as many colors as p-centered colorings. Although a set of k
Dyscyplina PBN
informatyka
Czasopismo
Algorithmica
Tom
83
Zeszyt
1
Strony od-do
361-386
ISSN
0178-4617
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