Abstract
In this paper, we investigate which processor networks allow k -label Interval Routing Schemes, under the assumption that costs of edges may vary. We show that for each fixed k ⩾1, the class of graphs allowing such routing schemes is closed under minor-taking in the domain of connected graphs, and hence has a linear time recognition algorithm. This result connects the theory of compact routing with the theory of graph minors and treewidth. We show that every graph that does not contain K 2, : r as a minor has treewidth at most 2 r −2. As a consequence, graphs that allow k -label Interval Routing Schemes under dynamic cost edges have treewidth at most 4 k . Similar results are shown for other types of Interval Routing Schemes.
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