Largest $2$-regular Subgraphs in complete $S$-partite Graphs
Abstract
In this paper, we focus on the class of complete -partite graphs, for an undirected graph possibly with self-loops, and address the problem of finding largest -regular subgraphs of these graphs, which can be formulated as an integer linear program. Roughly speaking, a complete -partite graph is obtained by replacing every single node of with a number of nodes, preserving the edge/non-edge relations of . Our motivation in finding largest -regular subgraphs is rooted in the structural systems theory, particularly in the problem of finding largest subnetworks that can sustain controllability or asymptotic stability of the corresponding subsystems. A main contribution of the paper is to show that the integer linear problem can be solved efficiently in , independent of the order/size of the -partite graph itself. Furthermore, we demonstrate through simulations that with high probability, a random -partite graph contains a largest -regular subgraph of the same order as its complete counterpart does.
Keywords
Cite
@article{arxiv.2603.27424,
title = {Largest $2$-regular Subgraphs in complete $S$-partite Graphs},
author = {Yiyang Jiang and Xudong Chen},
journal= {arXiv preprint arXiv:2603.27424},
year = {2026}
}
Comments
15 pages, 7 figures. Submitted to CDC 2026