Graph parameters that are coarsely equivalent to tree-length
Abstract
Two graph parameters are said to be coarsely equivalent if they are within constant factors from each other for every graph . Recently, several graph parameters were shown to be coarsely equivalent to tree-length. Recall that the length of a tree-decomposition of a graph is the largest diameter of a bag in , and the tree-length of is the minimum of the length, over all tree-decompositions of . We present simpler and sometimes with better bounds proofs for those known in literature results and further extend this list of graph parameters coarsely equivalent to tree-length. Among other new results, we show that the tree-length of a graph is small if and only if for every bramble (or every Helly family of connected subgraphs , or every Helly family of paths ) of , there is a disk in with small radius that intercepts all members of . Furthermore, the tree-length of a graph is small if and only if can be embedded with a small additive distortion to an unweighted tree with the same vertex set as in (not involving any Steiner points). Additionally, we introduce a new natural "bridging`` property for cycles, which generalizes a known property of cycles in chordal graphs, and show that it also coarsely defines the tree-length.
Keywords
Cite
@article{arxiv.2502.00951,
title = {Graph parameters that are coarsely equivalent to tree-length},
author = {Feodor F. Dragan},
journal= {arXiv preprint arXiv:2502.00951},
year = {2025}
}