Computing a 3-role assignment is polynomial-time solvable on complementary prisms
Abstract
A -role assignment of a simple graph is an assignment of distinct roles to the vertices of , such that two vertices with the same role have the same set of roles assigned to related vertices. Furthermore, a specific -role assignment defines a role graph, in which the vertices are the distinct roles, and there is an edge between two roles whenever there are two related vertices in the graph that correspond to these roles. We consider complementary prisms, which are graphs formed from the disjoint union of the graph with its respective complement, adding the edges of a perfect matching between their corresponding vertices. In this work, we characterize the complementary prisms that do not admit a -role assignment. We highlight that all of them are complementary prisms of disconnected bipartite graphs. Moreover, using our findings, we show that the problem of deciding whether a complementary prism has a -role assignment can be solved in polynomial time.
Cite
@article{arxiv.2402.06068,
title = {Computing a 3-role assignment is polynomial-time solvable on complementary prisms},
author = {Diane Castonguay and Elisângela S. Dias and Fernanda N. Mesquita and Julliano R. Nascimento},
journal= {arXiv preprint arXiv:2402.06068},
year = {2024}
}
Comments
20 pages, 4 figures