English

$k$-Blocks: a connectivity invariant for graphs

Combinatorics 2015-11-30 v4

Abstract

A kk-block in a graph GG is a maximal set of at least kk vertices no two of which can be separated in GG by fewer than kk other vertices. The block number β(G)\beta(G) of GG is the largest integer kk such that GG has a kk-block. We investigate how β\beta interacts with density invariants of graphs, such as their minimum or average degree. We further present algorithms that decide whether a graph has a kk-block, or which find all its kk-blocks. The connectivity invariant β(G)\beta(G) has a dual width invariant, the block-width bw(G){\rm bw}(G) of GG. Our algorithms imply the duality theorem β=bw\beta = {\rm bw}: a graph has a block-decomposition of width and adhesion <k< k if and only if it contains no kk-block.

Keywords

Cite

@article{arxiv.1305.4557,
  title  = {$k$-Blocks: a connectivity invariant for graphs},
  author = {Johannes Carmesin and Reinhard Diestel and Matthias Hamann and Fabian Hundertmark},
  journal= {arXiv preprint arXiv:1305.4557},
  year   = {2015}
}

Comments

22 pages, 5 figures. This is an extended version the journal article, which has by now appeared. The version here contains an improved version of Theorem 5.3 (which is now best possible) and an additional section with examples at the end

R2 v1 2026-06-22T00:19:13.645Z