Extended Path Partition Conjecture for Semicomplete and Acyclic Compositions

TL;DR

This paper proposes a stronger version of the Path Partition Conjecture for certain classes of digraphs, specifically acyclic and semicomplete compositions, and proves its validity for broad families within these classes.

Contribution

It introduces a new conjecture extending PPC and demonstrates its truth for wide families of acyclic and semicomplete compositions.

Findings

The stronger conjecture holds for wide families of acyclic compositions.

The stronger conjecture holds for wide families of semicomplete compositions.

Extension of PPC to broader classes of digraphs.

Abstract

Let $D$ be a digraph and let $\lambda(D)$ 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 $V(A)\cup V(B)=V(D).$ The Path Partition Conjecture (PPC) states that for every digraph, $D$, and every integer $q$ with $1\leq q\leq\lambda(D)-1$, there exists a partition $(A,B)$ of $D$ such that $\lambda(A)\leq q$ and $\lambda(B)\leq\lambda(D)-q.$ Let $T$ be a digraph with vertex set $\{u_1,\dots, u_t\}$ and for every $i\in [t]$, let $H_i$ be a digraph with vertex set $\{u_{i,j_i}\colon\, j_i\in [n_i]\}$. The {\em composition} $Q=T[H_1,\dots , H_t]$ of $T$ and $H_1,\ldots, H_t$ is a digraph with vertex set $\{u_{i,j_i}\colon\, i\in [t], j_i\in [n_i]\}$ and arc set $$A(Q)=\cup^t_{i=1}A(H_i)\cup \{u_{i,j_i}u_{p,q_p}\colon\, u_iu_p\in A(T), j_i\in [n_i], q_p\in [n_p]\}.$$ We say that $Q$ 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.