English

A dichotomy for the kernel by $H$-walks problem in digraphs

Combinatorics 2016-06-01 v1

Abstract

Let H=(VH,AH)H = (V_H, A_H) be a digraph which may contain loops, and let D=(VD,AD)D = (V_D, A_D) be a loopless digraph with a coloring of its arcs c:ADVHc: A_D \to V_H. An HH-walk of DD is a walk (v0,,vn)(v_0, \dots, v_n) of DD such that (c(vi1,vi),c(vi,vi+1))(c(v_{i-1}, v_i), c(v_i, v_{i+1})) is an arc of HH, for every 1in11 \le i \le n-1. For u,vVDu, v \in V_D, we say that uu reaches vv by HH-walks if there exists an HH-walk from uu to vv in DD. A subset SVDS \subseteq V_D is a kernel by HH-walks of DD if every vertex in VDSV_D \setminus S reaches by HH-walks some vertex in SS, and no vertex in SS can reach another vertex in SS by HH-walks. A panchromatic pattern is a digraph HH such that every arc-colored digraph DD has a kernel by HH-walks. In this work, we prove that every digraph HH is either a panchromatic pattern, or the problem of determining whether an arc-colored digraph DD has a kernel by HH-walks is NPNP-complete.

Cite

@article{arxiv.1605.09589,
  title  = {A dichotomy for the kernel by $H$-walks problem in digraphs},
  author = {Hortensia Galeana-Sánchez and César Hernández-Cruz},
  journal= {arXiv preprint arXiv:1605.09589},
  year   = {2016}
}

Comments

20 pages, 3 figures

R2 v1 2026-06-22T14:13:44.558Z