Bounded-Degree Cut is Fixed-Parameter Tractable

In the bounded-degree cut problem, we are given a multigraph G = (V,E), two disjoint vertex subsets A,B ⊆ V , two functions uA,uB : V → {0, 1, . . . , |E|} on V , and an integer k ≥ 0. The task is to determine whether there is a minimal (A,B)-cut (VA, VB) of size at most k such that the degree of each vertex v ∈ VA in the induced subgraph G[VA] is at most uA(v) and the degree of each vertex v ∈ VB in the induced subgraph G[VB ] is at most uB(v). In this paper, we show that the bounded-degree cut problem is fixed-parameter tractable by giving a 218k|G|O(1)-time algorithm. This is the first single exponential FPT algorithm for this problem. The core of the algorithm lies two new lemmas based on important cuts, which give some upper bounds on the number of candidates for vertex subsets in one part of a minimal cut satisfying some properties. These lemmas can be used to design fixed-parameter tractable algorithms for more related problems. 2012 ACM Subject Classification G.2.2 Graph Theory

[1]  Robert Krauthgamer,et al.  A polylogarithmic approximation of the minimum bisection , 2000, Proceedings 41st Annual Symposium on Foundations of Computer Science.

[2]  Dániel Marx,et al.  Parameterized graph separation problems , 2004, Theor. Comput. Sci..

[3]  Mohammad Taghi Hajiaghayi,et al.  Fixed-parameter tractability of directed multiway cut parameterized by the size of the cutset , 2011, SODA.

[4]  Bruce A. Reed,et al.  Multicuts in unweighted graphs and digraphs with bounded degree and bounded tree-width , 2003, J. Algorithms.

[5]  Dorit S. Hochbaum,et al.  A Polynomial Algorithm for the k-cut Problem for Fixed k , 1994, Math. Oper. Res..

[6]  Saket Saurabh,et al.  Balanced Judicious Bipartition is Fixed-Parameter Tractable , 2017, FSTTCS.

[7]  Michal Pilipczuk,et al.  Designing FPT Algorithms for Cut Problems Using Randomized Contractions , 2012, 2012 IEEE 53rd Annual Symposium on Foundations of Computer Science.

[8]  Frank Thomson Leighton,et al.  Multicommodity max-flow min-cut theorems and their use in designing approximation algorithms , 1999, JACM.

[9]  Mingyu Xiao,et al.  Simple and Improved Parameterized Algorithms for Multiterminal Cuts , 2009, Theory of Computing Systems.

[10]  Michael Stiebitz Decomposing graphs under degree constraints , 1996, J. Graph Theory.

[11]  Jianer Chen,et al.  An Improved Parameterized Algorithm for the Minimum Node Multiway Cut Problem , 2007, Algorithmica.

[12]  Eric V. Denardo,et al.  Flows in Networks , 2011 .

[13]  Mihalis Yannakakis,et al.  The Complexity of Multiterminal Cuts , 1994, SIAM J. Comput..

[14]  Hiroshi Nagamochi,et al.  Complexity and kernels for bipartition into degree-bounded induced graphs , 2014, Theor. Comput. Sci..

[15]  Zsolt Tuza,et al.  Efficient algorithms for decomposing graphs under degree constraints , 2007, Discret. Appl. Math..

[16]  Zsolt Tuza,et al.  Degree-constrained decompositions of graphs: Bounded treewidth and planarity , 2006, Theor. Comput. Sci..

[17]  Jørgen Bang-Jensen,et al.  Degree-constrained 2-partitions of graphs , 2018, Theor. Comput. Sci..

[18]  Satish Rao,et al.  Expander flows, geometric embeddings and graph partitioning , 2004, STOC '04.

[19]  Michal Pilipczuk,et al.  Solving the 2-Disjoint Connected Subgraphs Problem Faster than 2n , 2012, Algorithmica.

[20]  Michal Pilipczuk,et al.  Minimum bisection is fixed parameter tractable , 2013, STOC.

[21]  Paul Wollan,et al.  Finding topological subgraphs is fixed-parameter tractable , 2010, STOC '11.

[22]  Robert Krauthgamer,et al.  Approximating the minimum bisection size (extended abstract) , 2000, STOC '00.

[23]  Barry O'Sullivan,et al.  A fixed-parameter algorithm for the directed feedback vertex set problem , 2008, JACM.

[24]  Mohammad Taghi Hajiaghayi,et al.  Directed Subset Feedback Vertex Set Is Fixed-Parameter Tractable , 2010, TALG.

[25]  Uriel Feige,et al.  Finding small balanced separators , 2006, STOC '06.

[26]  Dániel Marx,et al.  Fixed-parameter tractability of multicut parameterized by the size of the cutset , 2010, STOC '11.

[27]  Ken-ichi Kawarabayashi,et al.  The Minimum k-way Cut of Bounded Size is Fixed-Parameter Tractable , 2011, 2011 IEEE 52nd Annual Symposium on Foundations of Computer Science.