On the parameterized complexity of computing tree-partitions
Abstract
We study the parameterized complexity of computing the tree-partition-width, a graph parameter equivalent to treewidth on graphs of bounded maximum degree. On one hand, we can obtain approximations of the tree-partition-width efficiently: we show that there is an algorithm that, given an -vertex graph and an integer , constructs a tree-partition of width for or reports that has tree-partition-width more than , in time . We can improve slightly on the approximation factor by sacrificing the dependence on , or on . On the other hand, we show the problem of computing tree-partition-width exactly is XALP-complete, which implies that it is -hard for all . We deduce XALP-completeness of the problem of computing the domino treewidth. Next, we adapt some known results on the parameter tree-partition-width and the topological minor relation, and use them to compare tree-partition-width to tree-cut width. Finally, for the related parameter weighted tree-partition-width, we give a similar approximation algorithm (with ratio now ) and show XALP-completeness for the special case where vertices and edges have weight 1.
Cite
@article{arxiv.2206.11832,
title = {On the parameterized complexity of computing tree-partitions},
author = {Hans L. Bodlaender and Carla Groenland and Hugo Jacob},
journal= {arXiv preprint arXiv:2206.11832},
year = {2025}
}
Comments
Journal version (DMTCS)