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 G. Recently, several graph parameters were shown to be coarsely equivalent to tree-length. Recall that the length of a tree-decomposition T(G) of a graph G is the largest diameter of a bag in T(G), and the tree-length of G is the minimum of the length, over all tree-decompositions of G. 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 G is small if and only if for every bramble F (or every Helly family of connected subgraphs F, or every Helly family of paths F) of G, there is a disk in G with small radius that intercepts all members of F. Furthermore, the tree-length of a graph G is small if and only if G can be embedded with a small additive distortion to an unweighted tree with the same vertex set as in G (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.

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