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ECCC
2011
2011
Graphs of Bounded Treewidth can be Canonized in AC1
In recent results the complexity of isomorphism testing on graphs of bounded treewidth is improved to TC1 [GV06] and further to LogCFL [DTW10]. The computation of canonical forms or a canonical labeling provides more information than isomorphism testing. Whether canonization is in NC or even TC1 was stated as an open question in [K¨ob06]. K¨obler and Verbitsky [KV08] give a TC2 canonical labeling algorithm. We show that a canonical labeling can be computed in AC1 . This is based on several ideas, e.g. that approximate tree decompositions of logarithmic depth can be obtained in logspace [EJT10a], and techniques of Lindells tree canonization algorithm [Lin92]. We define recursively what we call a minimal description which gives with respect to some parameters in a logarithmic number of levels a canonical invariant together with an arrangement of all vertices. From this we compute a canonical labeling.
Real-time Traffic| Added | 14 May 2011 |
| Updated | 14 May 2011 |
| Type | Journal |
| Year | 2011 |
| Where | ECCC |
| Authors | Fabian Wagner |
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