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A half-integral Erdos-Posa theorem for directed odd cycles

Authors
Kawarabayashi, Ken-ichiKreutzer, StephanKwon, O-JoungXie, Qiqin
Issue Date
Jan-2023
Publisher
SIAM
Citation
PROCEEDINGS OF THE 2023 ANNUAL ACM-SIAM SYMPOSIUM ON DISCRETE ALGORITHMS, SODA, pp 3043 - 3062
Pages
20
Journal Title
PROCEEDINGS OF THE 2023 ANNUAL ACM-SIAM SYMPOSIUM ON DISCRETE ALGORITHMS, SODA
Start Page
3043
End Page
3062
URI
https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/197955
DOI
10.1137/1.9781611977554.ch118
Abstract
We prove that there exists a function f : N -> R such that every directed graph G contains either k directed odd cycles where every vertex of G is contained in at most two of them, or a set of at most f(k) vertices meeting all directed odd cycles. We also give a polynomial-time algorithm for fixed k which outputs one of the two outcomes. Using this algorithmic result, we give a polynomial-time algorithm for fixed k to decide whether such k directed odd cycles exist, or there are no k vertex-disjoint directed odd cycles. This extends the half-integral Erdos-Posa theorem for undirected odd cycles by Reed [Combinatorica 1999] to directed graphs.
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