Shortest Paths in Planar Graphs with Real Lengths in $O(n\log^2n/\log\log n)$ Time

Christian Wulff-Nilsen; Shay Mozes

arxiv: 0911.4963 · v1 · submitted 2009-11-25 · 💻 cs.DM

Shortest Paths in Planar Graphs with Real Lengths in O(nlog²n/loglog n) Time

Shay Mozes , Christian Wulff-Nilsen This is my paper

classification 💻 cs.DM

keywords timegraphlengthsplanarrealshortestboundcompute

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Given an $n$-vertex planar directed graph with real edge lengths and with no negative cycles, we show how to compute single-source shortest path distances in the graph in $O(n\log^2n/\log\log n)$ time with O(n) space. This is an improvement of a recent time bound of $O(n\log^2n)$ by Klein et al.

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Shortest Paths in Planar Graphs with Real Lengths in O(nlog²n/loglog n) Time

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