On a family of strong geometric spanners that admit local routing strategies
Abstract
We introduce a family of directed geometric graphs, denoted , that depend on two parameters λ and θ. For 0≤ θ<π2 and 1/2 < λ < 1, the graph is a strong t-spanner, with t=1(1-λ)θ. The out-degree of a node in the graph is at most 2π/(θ, 12λ). Moreover, we show that routing can be achieved locally on . Next, we show that all strong t-spanners are also t-spanners of the unit disk graph. Simulations for various values of the parameters λ and θ indicate that for random point sets, the spanning ratio of is better than the proven theoretical bounds.
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