Computational complexity of covering regular trees

TL;DR

This paper investigates the computational complexity of the graph covering problem for regular trees with semi-edges, establishing NP-completeness results that extend previous findings to more general graph classes.

Contribution

It proves NP-completeness of the covering problem for regular graphs derived from trees with semi-edges, broadening the understanding of complexity in graph covering.

Findings

NP-completeness for regular graphs with semi-edges added to trees.

NP-hardness holds even for simple graphs in this class.

Extends previous complexity results to more general graph structures.

Abstract

A graph covering projection, also referred to as a locally bijective homomorphism, is a mapping between the vertices and edges of two graphs that preserves incidences and is a local bijection. This concept originates in topological graph theory but has also found applications in combinatorics and theoretical computer science. In this paper we consider undirected graphs in the most general setting -- graphs may contain multiple edges, loops, and semi-edges. This is in line with recent trends in topological graph theory and mathematical physics. We advance the study of the computational complexity of the {\sc $H$-Cover} problem, which asks whether an input graph allows a covering projection onto a parameter graph $H$. The quest for a complete characterization started in 1990's. Several results for simple graphs or graphs without semi-edges have been known, the role of semi-edges in the complexity setting has started to be investigated only recently. One of the most general known NP-hardness results states that {\sc $H$}-Cover is NP-complete for every simple connected regular graph of valency greater than two. We complement this result by considering regular graphs $H$ arising from connected acyclic graphs by adding semi-edges. Namely, we prove that any graph obtained by adding semi-edges to the vertices of a tree making it a $d$-regular graph with $d \geq 3$, defines an NP-complete graph covering problem. In line with the so called Strong Dichotomy Conjecture, we prove that the NP-hardness holds even for simple graphs on input.