English

Completely Independent Spanning Trees in Line Graphs

Combinatorics 2022-09-21 v1

Abstract

Completely independent spanning trees in a graph GG are spanning trees of GG such that for any two distinct vertices of GG, the paths between them in the spanning trees are pairwise edge-disjoint and internally vertex-disjoint. In this paper, we present a tight lower bound on the maximum number of completely independent spanning trees in L(G)L(G), where L(G)L(G) denotes the line graph of a graph GG. Based on a new characterization of a graph with kk completely independent spanning trees, we also show that for any complete graph KnK_n of order n4n \geq 4, there are n+12\lfloor \frac{n+1}{2} \rfloor completely independent spanning trees in L(Kn)L(K_n) where the number n+12\lfloor \frac{n+1}{2} \rfloor is optimal, such that n+12\lfloor \frac{n+1}{2} \rfloor completely independent spanning trees still exist in the graph obtained from L(Kn)L(K_n) by deleting any vertex (respectively, any induced path of order at most n2\frac{n}{2}) for n=4n = 4 or odd n5n \geq 5 (respectively, even n6n \geq 6). Concerning the connectivity and the number of completely independent spanning trees, we moreover show the following, where δ(G)\delta(G) denotes the minimum degree of GG.  \ \bullet Every 2k2k-connected line graph L(G)L(G) has kk completely independent spanning trees if GG is not super edge-connected or δ(G)2k\delta(G) \geq 2k.  \ \bullet Every (4k2)(4k-2)-connected line graph L(G)L(G) has kk completely independent spanning trees if GG is regular.  \ \bullet Every (k2+2k1)(k^2+2k-1)-connected line graph L(G)L(G) with δ(G)k+1\delta(G) \geq k+1 has kk completely independent spanning trees.

Keywords

Cite

@article{arxiv.2209.09565,
  title  = {Completely Independent Spanning Trees in Line Graphs},
  author = {Toru Hasunuma},
  journal= {arXiv preprint arXiv:2209.09565},
  year   = {2022}
}

Comments

20 pages with 5 figures

R2 v1 2026-06-28T01:43:20.597Z