Time-dependent shortest paths in bounded treewidth graphs
Abstract
We present a proof that the number of breakpoints in the arrival function between two terminals in graphs of treewidth w is nO(2 w) when the edge arrival functions are piecewise linear. This is an improvement on the bound of n( n) by Foschini, Hershberger, and Suri for graphs without any bound on treewidth. We provide an algorithm for calculating this arrival function using star-mesh transformations, a generalization of the wye-delta-wye transformations.
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