Branch-depth: Generalizing tree-depth of graphs
Abstract
We present a concept called the branch-depth of a connectivity function, that generalizes the tree-depth of graphs. Then we prove two theorems showing that this concept aligns closely with the notions of tree-depth and shrub-depth of graphs as follows. For a graph and a subset of we let be the number of vertices incident with an edge in and an edge in . For a subset of , let be the rank of the adjacency matrix between and over the binary field. We prove that a class of graphs has bounded tree-depth if and only if the corresponding class of functions has bounded branch-depth and similarly a class of graphs has bounded shrub-depth if and only if the corresponding class of functions has bounded branch-depth, which we call the rank-depth of graphs. Furthermore we investigate various potential generalizations of tree-depth to matroids and prove that matroids representable over a fixed finite field having no large circuits are well-quasi-ordered by the restriction.
Keywords
Cite
@article{arxiv.1903.11988,
title = {Branch-depth: Generalizing tree-depth of graphs},
author = {Matt DeVos and O-joung Kwon and Sang-il Oum},
journal= {arXiv preprint arXiv:1903.11988},
year = {2020}
}
Comments
36 pages, 2 figures. Final version