Local Routing on Ordered -graphs

Abstract

The problem of locally routing on geometric networks using limited memory is extensively studied in computational geometry. We consider one particular graph, the ordered -graph, which is significantly harder to route on than the -graph, for which a number of routing algorithms are known. Currently, no local routing algorithm is known for the ordered -graph. We prove that, unfortunately, there does not exist a deterministic memoryless local routing algorithm that works on the ordered -graph. This motivates us to consider allowing a small amount of memory, and we present a deterministic O(1)-memory local routing algorithm that successfully routes from the source to the destination on the ordered -graph. We show that our local routing algorithm converges to the destination in O(n) hops, where n is the number of vertices. To the best of our knowledge, our algorithm is the first deterministic local routing algorithm that is guaranteed to reach the destination on the ordered -graph.