English

Semicomplete Compositions of Digraphs

Combinatorics 2020-05-05 v1

Abstract

Let TT be a digraph with vertices u1,,utu_1, \dots, u_t (t2t\ge 2) and let H1,,HtH_1, \dots, H_t be digraphs such that HiH_i has vertices ui,ji, 1jini.u_{i,j_i},\ 1\le j_i\le n_i. Then the composition Q=T[H1,,Ht]Q=T[H_1, \dots, H_t] is a digraph with vertex set {ui,ji ⁣:1it,1jini}\{u_{i,j_i}\colon\, 1\le i\le t, 1\le j_i\le n_i\} and arc set A(Q)=i=1tA(Hi){uijiupqp ⁣:uiupA(T),1jini,1qpnp}.A(Q)=\cup^t_{i=1}A(H_i)\cup \{u_{ij_i}u_{pq_p}\colon\, u_iu_p\in A(T), 1\le j_i\le n_i, 1\le q_p\le n_p\}. The composition Q=T[H1,,Ht]Q=T[H_1, \dots, H_t] is a semicomplete composition if TT is semicomplete, i.e. there is at least one arc between every pair of vertices. Digraph compositions generalize some families of digraphs, including (extended) semicomplete digraphs, quasi-transitive digraphs and lexicographic product digraphs. In particular, strong semicomplete compositions form a significant generalization of strong quasi-transitive digraphs. In this paper, we study the structural properties of semicomplete compositions and obtain results on connectivity, paths, cycles, strong spanning subdigraphs and acyclic spanning subgraphs. Our results show that this class of digraphs shares some nice properties of quasi-transitive digraphs.

Keywords

Cite

@article{arxiv.2005.01050,
  title  = {Semicomplete Compositions of Digraphs},
  author = {Yuefang Sun},
  journal= {arXiv preprint arXiv:2005.01050},
  year   = {2020}
}
R2 v1 2026-06-23T15:16:20.904Z