English

Packing spanning rigid subgraphs with restricted degrees

Combinatorics 2018-06-22 v1

Abstract

Let GG be a graph and let ll be an integer-valued function on subsets of V(G)V(G). The graph GG is said to be ll-partition-connected, if for every partition PP of V(G)V(G), eG(P)APl(A)l(V(G))e_G(P)\ge \sum_{A\in P} l(A)-l(V(G)), where eG(P)e_G(P) denotes the number of edges of GG joining different parts of PP. We say that GG is ll-rigid, if it contains a spanning ll-partition-connected subgraph HH with E(H)=vV(H)l(v)l(V(H))|E(H)|=\sum_{v\in V(H)} l(v)-l(V(H)). In this paper, we investigate decomposition of graphs into spanning partition-connected and spanning rigid subgraphs. As a consequence, we improve a recent result due to Gu (2017) by proving that every (4kp2p+2m)(4kp-2p+2m)-connected graph GG with k2k\ge 2 has a spanning subgraph HH containing a packing of mm spanning trees and pp spanning (2k1)(2k-1)-edge-connected subgraphs H1,,HpH_1,\ldots, H_p such that for each vertex vv, every HivH_i-v remains (k1)(k-1)-edge-connected and also dH(v)dG(v)2+2kpp+md_H(v)\le \lceil \frac{d_G(v)}{2}\rceil +2kp-p+m. From this result, we refine a result on arc-connected orientations of graphs.

Keywords

Cite

@article{arxiv.1806.07877,
  title  = {Packing spanning rigid subgraphs with restricted degrees},
  author = {Morteza Hasanvand},
  journal= {arXiv preprint arXiv:1806.07877},
  year   = {2018}
}

Comments

arXiv admin note: text overlap with arXiv:1806.00135

R2 v1 2026-06-23T02:36:23.449Z