Measuring what matters: A hybrid approach to dynamic programming with treewidth
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摘要
We develop a framework for applying treewidth-based dynamic programming on graphs with “hybrid structure”, i.e., with parts that may not have small treewidth but instead possess other structural properties. Informally, this is achieved by defining a refinement of treewidth which only considers parts of the graph that do not belong to a pre-specified tractable graph class. Our approach allows us to not only generalize existing fixed-parameter algorithms exploiting treewidth, but also fixed-parameter algorithms which use the size of a modulator as their parameter. As the flagship application of our framework, we obtain a parameter that combines treewidth and rank-width to obtain fixed-parameter algorithms for Chromatic Number, Hamiltonian Cycle, and Max-Cut.
论文关键词:Parameterized complexity,Treewidth,Rank-width,Fixed-parameter algorithms
论文评审过程:Received 7 April 2020, Revised 9 April 2021, Accepted 29 April 2021, Available online 11 May 2021, Version of Record 26 May 2021.
论文官网地址:https://doi.org/10.1016/j.jcss.2021.04.005