The Complexity of Bounded Length Graph Recoloring

Abstract

We study the following question: Given are two k-colorings α and β of a graph G on n vertices, and integer . The question is whether α can be modified into β, by recoloring vertices one at a time, while maintaining a k-coloring throughout, and using at most such recoloring steps. This problem is weakly PSPACE-hard for every constant k 4. We show that it is also strongly NP-hard for every constant k 4. On the positive side, we give an O(f(k,) nO(1)) algorithm for the problem, for some computable function f. Hence the problem is fixed-parameter tractable when parameterized by k+. Finally, we show that the problem is W[1]-hard (but in XP) when parameterized only by .