A monitoring edge-geodetic set (or meg-set for short) of a graph is a set of vertices M such that if any edge is removed, then the distance between some two vertices of M increases. This notion was introduced by Foucaud et al. in 2023 as a way to monitor networks for communication failures. As computing a minimal meg-set is hard in general, recent works aimed to find polynomial-time algorithms to compute minimal meg-sets when the input belongs to a restricted class of graphs. Most of these results are based on the property of some classes of graphs to admit a unique minimum meg-set, which is then easy to compute. In this work, we prove that chordal graphs also admit a unique minimal meg-set, answering a standing open question of Foucaud et al.
Marcille et al. (Wed,) studied this question.