Edit distance with Quasi Real Penalties: a hybrid distance for network-constrained trajectories

Noudéhouénou Lionel Jaderne Houssou, Jean-Loup Guillaume, A. Prigent
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Abstract

In this paper, we propose a new distance for network-constrained trajectories named Edit distance with Quasi Real Penalties (EQRP). Depending on the case, it can compare trajectories as non-ordered sets and as sequences while other distances only compare trajectories as non-ordered sets or as sequences. Moreover, it is parameter-free, manages local time shifting, and respects triangle inequality; three properties expected from a trajectory distance that are not satisfied simultaneously by any other distance to the best of our knowledge. To demonstrate the pertinence of our idea, we benchmark our distance against some state-of-the-art distances for network-constrained trajectories. Specifically, for each distance, we determine its capability to identify precisely similar trajectories. We also determine their respective performance for trajectory clustering. Our results show the predominance of EQRP over the existing edit distances and in some cases a more precise ability to evaluate the dissimilarity between network-constrained trajectories compared to other measures.
带准实惩罚的编辑距离:网络约束轨迹的混合距离
本文提出了一种新的网络约束轨迹距离,称为带拟实惩罚的编辑距离(EQRP)。根据具体情况,它可以将轨迹作为无序集和序列进行比较,而其他距离只能将轨迹作为无序集或序列进行比较。此外,它是无参数的,能控制局部时移,并尊重三角形不等式;据我们所知,轨道距离不能同时满足其他距离的三个特性。为了证明我们的想法的相关性,我们将我们的距离与网络约束轨迹的一些最先进的距离进行基准测试。具体来说,对于每一段距离,我们确定其识别精确相似轨迹的能力。我们还确定了它们各自的轨迹聚类性能。我们的结果表明,EQRP优于现有的编辑距离,并且在某些情况下,与其他措施相比,更精确地评估网络约束轨迹之间的差异。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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