Sparse highly connected spanning subgraphs in dense directed graphs
Abstract
Mader proved that every strongly -connected -vertex digraph contains a strongly -connected spanning subgraph with at most edges, where the equality holds for the complete bipartite digraph . For dense strongly -connected digraphs, this upper bound can be significantly improved. More precisely, we prove that every strongly -connected -vertex digraph contains a strongly -connected spanning subgraph with at most edges, where denotes the maximum degree of the complement of the underlying undirected graph of a digraph . Here, the additional term is tight up to multiplicative and additive constants. As a corollary, this implies that every strongly -connected -vertex semicomplete digraph contains a strongly -connected spanning subgraph with at most edges, which is essentially optimal since cannot be reduced to the number less than . We also prove an analogous result for strongly -arc-connected directed multigraphs. Both proofs yield polynomial-time algorithms.
Cite
@article{arxiv.1801.01795,
title = {Sparse highly connected spanning subgraphs in dense directed graphs},
author = {Dong Yeap Kang},
journal= {arXiv preprint arXiv:1801.01795},
year = {2019}
}
Comments
31 pages