Extremal results on feedback arc sets in digraphs

被引:0
|
作者
Fox, Jacob [1 ]
Himwich, Zoe [2 ]
Mani, Nitya [3 ]
机构
[1] Stanford Univ, Dept Math, Stanford, CA USA
[2] Columbia Univ, Dept Math, New York, NY USA
[3] MIT, Dept Math, Cambridge, MA 02139 USA
来源
RANDOM STRUCTURES & ALGORITHMS | 2024年 / 64卷 / 02期
基金
美国国家科学基金会;
关键词
Directed graphs; extremal graph theory; feedback arc sets; forbidden subgraph; maximum acyclic subgraph; GRAPHS; SUBGRAPHS; CYCLES;
D O I
10.1002/rsa.21179
中图分类号
TP31 [计算机软件];
学科分类号
081202 ; 0835 ;
摘要
For an oriented graph G, let beta(G) denote the size of a minimum feedback arc set, a smallest edge subset whose deletion leaves an acyclic subgraph. Berger and Shor proved that any m-edge oriented graph G satisfies beta(G) = m/2- O(m3/ 4). We observe that if an oriented graph G has a fixed forbidden subgraph B, the bound beta(G) = m/2 O(m3/4) is sharp as a function of m if B is not bipartite, but the exponent 3/ 4 in the lower order term can be improved if B is bipartite. Using a result of Bukh and Conlon on Turan numbers, we prove that any rational number in [3/ 4, 1] is optimal as an exponent for some finite family of forbidden subgraphs. Our upper bounds come equipped with randomized linear-time algorithms that construct feedback arc sets achieving those bounds. We also characterize directed quasirandomness via minimum feedback arc sets.
引用
收藏
页码:287 / 308
页数:22
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