On Single-Objective Sub-Graph-Based Mutation for Solving the Bi-Objective Minimum Spanning Tree Problem

Bossek, Jakob; Grimme, Christian

Forschungsartikel (Zeitschrift) | Peer reviewed

Zusammenfassung

We contribute to the efficient approximation of the Pareto-set for the classical NP-hard multi-objective minimum spanning tree problem (moMST) adopting evolutionary computation. More precisely, by building upon preliminary work, we analyse the neighborhood structure of Pareto-optimal spanning trees and design several highly biased sub-graph-based mutation operators founded on the gained insights. In a nutshell, these operators replace (un)connected sub-trees of candidate solutions with locally optimal sub-trees. The latter (biased) step is realized by applying Kruskal's single-objective MST algorithm to a weighted sum scalarization of a sub-graph.We prove runtime complexity results for the introduced operators and investigate the desirable Pareto-beneficial property. This property states that mutants cannot be dominated by their parent. Moreover, we perform an extensive experimental benchmark study to showcase the operator's practical suitability. Our results confirm that the subgraph based operators beat baseline algorithms from the literature even with severely restricted computational budget in terms of function evaluations on four different classes of complete graphs with different shapes of the Pareto-front.

Details zur Publikation

FachzeitschriftEvolutionary Computation
Jahrgang / Bandnr. / Volume32
Ausgabe / Heftnr. / Issue2
Seitenbereich143-175
StatusVeröffentlicht
Veröffentlichungsjahr2024
Sprache, in der die Publikation verfasst istEnglisch
DOI10.1162/evco_a_00335
StichwörterEvolutionary algorithms; multi-objective optimization; minimum spanning tree problem; biased mutation

Autor*innen der Universität Münster

Grimme, Christian
Forschungsgruppe Computational Social Science and Systems Analysis (CSSSA)