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FOCS
2005
IEEE
2005
IEEE
Algorithmic Graph Minor Theory: Decomposition, Approximation, and Coloring
At the core of the seminal Graph Minor Theory of Robertson and Seymour is a powerful structural theorem capturing the structure of graphs excluding a fixed minor. This result is used throughout graph theory and graph algorithms, but is existential. We develop a polynomialtime algorithm using topological graph theory to decompose a graph into the structure guaranteed by the theorem: a clique-sum of pieces almost-embeddable into boundedgenus surfaces. This result has many applications. In particular, we show applications to developing many approximation algorithms, including a 2-approximation to graph coloring, constant-factor approximations to treewidth and the largest grid minor, combinatorial polylogarithmicapproximation to half-integral multicommodity flow, subexponential fixed-parameter algorithms, and PTASs for many minimization and maximization problems, on graphs excluding a fixed minor.
Real-time TrafficFOCS 2005 | Graph Minor Theory | Graph Theory | Theoretical Computer Science | Topological Graph Theory |
Related Content
| Added | 24 Jun 2010 |
| Updated | 24 Jun 2010 |
| Type | Conference |
| Year | 2005 |
| Where | FOCS |
| Authors | Erik D. Demaine, Mohammad Taghi Hajiaghayi, Ken-ichi Kawarabayashi |
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