English

Extended Path Partition Conjecture for Semicomplete and Acyclic Compositions

Combinatorics 2021-11-19 v1 Discrete Mathematics

Abstract

Let DD be a digraph and let λ(D)\lambda(D) denote the number of vertices in a longest path of DD. For a pair of vertex-disjoint induced subdigraphs AA and BB of DD, we say that (A,B)(A,B) is a partition of DD if V(A)V(B)=V(D).V(A)\cup V(B)=V(D). The Path Partition Conjecture (PPC) states that for every digraph, DD, and every integer qq with 1qλ(D)11\leq q\leq\lambda(D)-1, there exists a partition (A,B)(A,B) of DD such that λ(A)q\lambda(A)\leq q and λ(B)λ(D)q.\lambda(B)\leq\lambda(D)-q. Let TT be a digraph with vertex set {u1,,ut}\{u_1,\dots, u_t\} and for every i[t]i\in [t], let HiH_i be a digraph with vertex set {ui,ji ⁣:ji[ni]}\{u_{i,j_i}\colon\, j_i\in [n_i]\}. The {\em composition} Q=T[H1,,Ht]Q=T[H_1,\dots , H_t] of TT and H1,,HtH_1,\ldots, H_t is a digraph with vertex set {ui,ji ⁣:i[t],ji[ni]}\{u_{i,j_i}\colon\, i\in [t], j_i\in [n_i]\} and arc set A(Q)=i=1tA(Hi){ui,jiup,qp ⁣:uiupA(T),ji[ni],qp[np]}.A(Q)=\cup^t_{i=1}A(H_i)\cup \{u_{i,j_i}u_{p,q_p}\colon\, u_iu_p\in A(T), j_i\in [n_i], q_p\in [n_p]\}. We say that QQ is acyclic {(semicomplete, respectively)} if TT is acyclic {(semicomplete, respectively)}. In this paper, we introduce a conjecture stronger than PPC using a property first studied by Bang-Jensen, Nielsen and Yeo (2006) and show that the stronger conjecture holds for wide families of acyclic and semicomplete compositions.

Keywords

Cite

@article{arxiv.2111.09633,
  title  = {Extended Path Partition Conjecture for Semicomplete and Acyclic Compositions},
  author = {Jiangdong Ai and Stefanie Gerke and Gregory Gutin and Yacong Zhou},
  journal= {arXiv preprint arXiv:2111.09633},
  year   = {2021}
}

Comments

9 pages

R2 v1 2026-06-24T07:43:21.690Z