Bidimensionality
Bidimensionality theory characterizes a broad range of graph problems (bidimensional) that admit efficient approximate, fixed-parameter or kernel solutions in a broad range of graphs. These graph classes include planar graphs, map graphs, bounded-genus graphs and graphs excluding any fixed minor. In particular, bidimensionality theory builds on the Graph Minor Theory of Robertson and Seymour by extending the mathematical results and building new algorithmic tools. The theory was introduced in the work of Demaine, Fomin, Hajiaghayi, and Thilikos.[1]
Definition
A parameterized problem is a subset of for some finite alphabet . An instance of a parameterized problem consists of (x,k), where k is called the parameter.
A parameterized problem is minor-bidimensional if
- For any pair of graphs , such that is a minor of and integer , yields that . In other words, contracting or deleting an edge in a graph cannot increase the parameter; and
- there is such that for every -grid , for every . In other words, the value of the solution on should be at least .
Examples of minor-bidimensional problems are the parameterized versions of Vertex Cover, Independent Set, Feedback Vertex Set, Minimum Maximal Matching, and Longest Path.
Let be the graph obtained from the -grid by triangulating internal faces such that all internal vertices become of degree 6, and then one corner of degree two joined by edges with all vertices of the external face. A parameterized problem is contraction-bidimensional if
- For any pair of graphs , such that is a contraction of and integer , yields that . In other words, contracting an edge in a graph cannot increase the parameter; and
- there is such that for every .
Examples of contraction-bidimensional problems are Dominating Set, Connected Dominating Set, Max-Leaf Spanning Tree, and Edge Dominating Set|.
Excluding Grid Theorems
All algorithmic applications of bidimensionality are based on the following combinatorial property: either the treewidth of a graph is small, or the graph contains a large grid as a minor or contraction. More precisely,
- There is a function f such that every graph G excluding a fixed h-vertex graph as a minor and of treewidth at least f(h)r contains (r x r)-grid as a minor.[2]
- There is a function g such that every graph G excluding a fixed h-vertex apex graph as a minor and of treewidth at least g(h) r can be edge-contracted to .[3]
Subexponential parameterized algorithms
Let be a minor-bidimensional problem such that for any graph G excluding some fixed graph as a minor and of treewidth at most t, deciding whether can be done in time . Then for every graph G excluding some fixed graph as a minor, deciding whether can be done in time . Similarly, for contraction-bidimensional problems, for graph G excluding some fixed apex graph as a minor, inclusion can be decided in time .
Thus many bidimensional problems like Vertex Cover, Dominating Set, k-Path, are solvable in time on graphs excluding some fixed graph as a minor.
Polynomial Time Approximation Schemes (PTAS)
Bidimensionality theory has been used to obtain Polynomial Time Approximation Schemes (PTAS) for many bidimensional problems. If a minor (contraction) bidimensional problem has several additional properties [4][5] then the problem poses Efficient Polynomial Time Approximation Scheme (EPTAS) on (apex) minor-free graphs.
In particular, by making use of Bidimensionality, it was shown that Feedback Vertex Set, Vertex Cover, Connected Vertex Cover, Cycle Packing, Diamond Hitting Set, Maximum Induced Forest, Maximum Induced Bipartite Subgraph and Maximum Induced Planar Subgraph admit an EPTAS on H-minor-free graphs. Edge Dominating Set, Dominating Set, r-Dominating Set, Connected Dominating Set, r-Scattered Set, Minimum Maximal Matching, Independent Set, Maximum Full-Degree Spanning Tree, Max Induced at most d-Degree Subgraph, Max Internal Spanning Tree, Induced Matching, Triangle Packing, Partial r-Dominating Set and Partial Vertex Cover admit an EPTAS on apex-minor-free graphs.
Kernelization
A parameterized problem with a parameter k is said to admit a linear vertex kernel if there is a polynomial time reduction, called a kernelization algorithm, that maps the input instance to an equivalent instance with at most O(k) vertices.
Every minor-bidimensional problem with additional properties, namely, with the separation property and with finite integer index, has a linear vertex kernel on graphs excluding some fixed graph as a minor. Similarly, every contraction-bidimensional problem with the separation property and with finite integer index has a linear vertex kernel on graphs excluding some fixed apex graph as a minor.[6]
Notes
- ^ Demaine et al. (2005)
- ^ Demaine & Hajiaghayi (2008) harvtxt error: multiple targets (2×): CITEREFDemaineHajiaghayi2008 (help)
- ^ Fomin, Golovach & Thilikos (2009)
- ^ Fomin et al. (2010)
- ^ Demaine & Hajiaghayi (2005)
- ^ Fomin et al. (2010)
References
- Demaine, Erik D.; Fomin, Fedor V.; Hajiaghayi, MohammadTaghi; Thilikos, Dimitrios M. (2005), "Subexponential parameterized algorithms on bounded-genus graphs and H-minor-free graphs", J. ACM, 52 (6): 866–893, doi:10.1145/1101821.1101823.
- Demaine, Erik D.; Fomin, Fedor V.; Hajiaghayi, MohammadTaghi; Thilikos, Dimitrios M. (2004), "Bidimensional parameters and local treewidth", SIAM Journal on Discrete Mathematics, 18 (3): 501–511, doi:10.1137/S0895480103433410.
- Demaine, Erik D.; Hajiaghayi, MohammadTaghi (2005), "Bidimensionality: new connections between FPT algorithms and PTASs", 16th ACM-SIAM Symposium on Discrete Algorithms (SODA 2005), pp. 590–601.
- Demaine, Erik D.; Hajiaghayi, MohammadTaghi (2008), "Linearity of grid minors in treewidth with applications through bidimensionality", Combinatorica, 28 (1): 19–36, doi:10.1007/s00493-008-2140-4.
- Demaine, Erik D.; Hajiaghayi, MohammadTaghi (2008), "The bidimensionality theory and its algorithmic applications", The Computer Journal, 51 (3): 332–337, doi:10.1093/comjnl/bxm033.
- Fomin, Fedor V.; Golovach, Petr A.; Thilikos, Dimitrios M. (2009), "Contraction Bidimensionality: The Accurate Picture", 17th Annual European Symposium on Algorithms (ESA 2009), Lecture Notes in Computer Science, vol. 5757, pp. 706–717, doi:10.1007/978-3-642-04128-0_63.
- Fomin, Fedor V.; Lokshtanov, Daniel; Raman, Venkatesh; Saurabh, Saket (2010), "Bidimensionality and EPTAS", arXiv:1005.5449
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(help).Proc. 22nd ACM/SIAM Symposium on Discrete Algorithms (SODA 2011), pp. 748-759. - Fomin, Fedor V.; Lokshtanov, Daniel; Saurabh, Saket; Thilikos, Dimitrios M. (2010), "Bidimensionality and Kernels", 21st ACM-SIAM Symposium on Discrete Algorithms (SODA 2010), pp. 503–510.