Approximately coloring graphs without long induced paths
Abstract
It is an open problem whether the 3-coloring problem can be solved in polynomial time in the class of graphs that do not contain an induced path on t vertices, for fixed t. We propose an algorithm that, given a 3-colorable graph without an induced path on t vertices, computes a coloring with \5,2t-12-2\ many colors. If the input graph is triangle-free, we only need \4,t-12+1\ many colors. The running time of our algorithm is O((3t-2+t2)m+n) if the input graph has n vertices and m edges.
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