近似加权正方形和六边形网格中的最短路径

Prosenjit Bose, Guillermo Esteban, David Orden, Rodrigo I. Silveira
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摘要

连续的二维空间通常通过考虑加权单元网格来离散化。在这项工作中,我们将研究加权网格在最短路径方面对空间的逼近程度。我们考虑连续二维空间中从 $ s $ 到 $ t $ 的最短路径 $ \mathit{SP_w}(s,t) $、最短顶点路径 $ \mathit{SVP_w}(s,t) $(或任意角度路径)、和最短网格路径 $ \mathit{SGP_w}(s,t) $,后者是与加权网格相关的图中的最短路径。我们提供了 $ \frac\{lVert \mathit{SGP_w}(s,t)\rVert}{\lVert\mathit{SP_w}(s,t)\rVert} $, $ \frac\{lVert \mathit{SVP_w}(s,t)\rVert}{\lVert\mathit{SP_w}(s. t)\rVert} $, $ \frac\{lVert \mathit{SVP_w}(s,t)\rVert}{\lVert\mathit{SP_w}(s. t)\rVert} $ 的上界和下界、$, $ \frac\mathit{SGP_w}(s,t)\rVert}{lVert\mathit{SVP_w}(s,t)\rVert} $ in square and hexagonal meshes, extend previousresults for triangular grids.这些比值决定了现有算法计算网格所获图形上最短路径的有效性。我们的主要结果是:比值 ${frac\lVert\mathit{SGP_w}(s,t)\rVert}{lVert \mathit{SP_w}(s,t)\rVert} $ 最多为 $\frac{2}{sqrt{2+\sqrt{2}}}.\在正方形和六边形网格中分别为大约 1.08 $ 和大约 1.04 $。
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Approximating shortest paths in weighted square and hexagonal meshes
Continuous 2-dimensional space is often discretized by considering a mesh of weighted cells. In this work we study how well a weighted mesh approximates the space, with respect to shortest paths. We consider a shortest path $ \mathit{SP_w}(s,t) $ from $ s $ to $ t $ in the continuous 2-dimensional space, a shortest vertex path $ \mathit{SVP_w}(s,t) $ (or any-angle path), which is a shortest path where the vertices of the path are vertices of the mesh, and a shortest grid path $ \mathit{SGP_w}(s,t) $, which is a shortest path in a graph associated to the weighted mesh. We provide upper and lower bounds on the ratios $ \frac{\lVert \mathit{SGP_w}(s,t)\rVert}{\lVert \mathit{SP_w}(s,t)\rVert} $, $ \frac{\lVert \mathit{SVP_w}(s,t)\rVert}{\lVert \mathit{SP_w}(s,t)\rVert} $, $ \frac{\lVert \mathit{SGP_w}(s,t)\rVert}{\lVert \mathit{SVP_w}(s,t)\rVert} $ in square and hexagonal meshes, extending previous results for triangular grids. These ratios determine the effectiveness of existing algorithms that compute shortest paths on the graphs obtained from the grids. Our main results are that the ratio $ \frac{\lVert \mathit{SGP_w}(s,t)\rVert}{\lVert \mathit{SP_w}(s,t)\rVert} $ is at most $ \frac{2}{\sqrt{2+\sqrt{2}}} \approx 1.08 $ and $ \frac{2}{\sqrt{2+\sqrt{3}}} \approx 1.04 $ in a square and a hexagonal mesh, respectively.
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