Extended Path Partition Conjecture for Semicomplete and Acyclic Compositions

Abstract

Let D be a digraph and let λ(D) denote the number of vertices in a longest path of D. For a pair of vertex-disjoint induced subdigraphs A and B of D, we say that (A,B) is a partition of D if V(A) V(B)=V(D). The Path Partition Conjecture (PPC) states that for every digraph, D, and every integer q with 1≤ q≤λ(D)-1, there exists a partition (A,B) of D such that λ(A)≤ q and λ(B)≤λ(D)-q. Let T be a digraph with vertex set \u1,…, ut\ and for every i∈ [t], let Hi be a digraph with vertex set \ui,ji\, ji∈ [ni]\. The composition Q=T[H1,… , Ht] of T and H1,…, Ht is a digraph with vertex set \ui,ji\, i∈ [t], ji∈ [ni]\ and arc set A(Q)=ti=1A(Hi) \ui,jiup,qp\, uiup∈ A(T), ji∈ [ni], qp∈ [np]\. We say that Q is acyclic (semicomplete, respectively) if T 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.