On $(k,l,H)$-kernels by walks and the H-class digraph

TL;DR

This paper establishes sufficient conditions for the existence of $(k,l,H)$-kernels by walks in $H$-colored digraphs, linking kernel existence to properties of $H$-class partitions and their associated digraphs, with some conditions verifiable in polynomial time.

Contribution

It introduces new sufficient conditions involving $H$-class partitions and $H$-class digraphs that guarantee the existence of $(k,l,H)$-kernels in $H$-colored digraphs, and analyzes the tightness of these conditions.

Findings

If every class in an $H$-class partition induces a strongly connected digraph, then a $(k,k-1,H)$-kernel exists for all $k extgreater=2$.

Some conditions for kernel existence can be checked in polynomial time.

The paper shows tightness of certain conditions for the existence of $(k,l,H)$-kernels.

Abstract

Let $H$ be a digraph possibly with loops and $D$ a digraph without loops whose arcs are colored with the vertices of $H$ ($D$ is said to be an $H-$colored digraph). If $W=(x_{0},\ldots,x_{n})$ is an open walk in $D$ and $i\in \{1,\ldots,n-1\}$, we say that there is an obstruction on $x_{i}$ if $(color(x_{i-1},x_{i}),color(x_{i},x_{i+1}))\notin A(H)$. If $S\subseteq V(D)$, we say that $S$ is a $(k,l,H)$-kernel by walks if for every pair of different vertices in $S$, every walk between them has at least $k-1$ obstructions, and for every $x\in V(D)\setminus S$ there exists an $xS$-walk with at most $l-1$ obstructions. If $D$ is an $H$-colored digraph, an $H$-class partition is a partition $\mathscr{F}$ of $A(D)$ such that, for every $\{(u,v),(v,w)\}\subseteq A(D)$, $(color(u,v),color(v,w))\in A(H)$ iff there exists $F$ in $\mathscr{F}$ such that $\{(u,v),(v,w)\}\subseteq F$. The $H$-class digraph relative to $\mathscr{F}$, denoted by $C_{\mathscr{F}}(D)$, is the digraph such that $V(C_{\mathscr{F}}(D))=\mathscr{F}$, and $(F,G)\in A(C_{\mathscr{F}}(D))$ if and only if there exist $(u,v)\in F$ and $(v,w)\in G$ with $\{u,v,w\}\subseteq V(D)$. We will show sufficient conditions on $\mathscr{F}$ and $C_{\mathscr{F}}(D)$ to guarantee the existence of $(k,l,H)$-kernels by walks in $H$-colored digraphs, and we will show that some conditions are tight. For instance, we will show that if an $H$-colored digraph $D$ has an $H$-class partition in which every class induces a strongly connected digraph, and has an obstruction-free vertex, then for every $k\geq 2$, $D$ has a $(k,k-1,H)$-kernel by walks. Despite the fact that finding $(k,l)$-kernels in arbitrary $H$-colored digraphs is an NP-complete problem, some hypothesis presented in this paper can be verified in polynomial time.