@inproceedings{c1e9ffb51c3d4999a42d162cc3333457,
title = "A node-capacitated okamura-seymour theorem",
abstract = "The classical Okamura-Seymour theorem states that for an edge-capacitated, multi-commodity flow instance in which all terminals lie on a single face of a planar graph, there exists a feasible concurrent flow if and only if the cut conditions are satisfied. Simple examples show that a similar theorem is impossible in the node-capacitated setting. Nevertheless, we prove that an approximate flow/cut theorem does hold: For some universal {"} ε > 0, if the node cut conditions are satisfied, then one can simultaneously route an {"} ε- fraction of all the demands. This answers an open question of Chekuri and Kawarabayashi. More generally, we show that this holds in the setting of multi-commodity polymatroid networks introduced by Chekuri, et. al. Our approach employs a new type of random metric embedding in order to round the convex programs corresponding to these more general flow problems.",
keywords = "Metric embeddings, Multi-commodity flows",
author = "Lee, {James R.} and Manor Mendel and Mohamad Moharrami",
year = "2013",
doi = "https://doi.org/10.1145/2488608.2488671",
language = "الإنجليزيّة",
isbn = "9781450320290",
series = "Proceedings of the Annual ACM Symposium on Theory of Computing",
pages = "495--504",
booktitle = "STOC 2013 - Proceedings of the 2013 ACM Symposium on Theory of Computing",
note = "45th Annual ACM Symposium on Theory of Computing, STOC 2013 ; Conference date: 01-06-2013 Through 04-06-2013",
}