(k, l)-Medians Clustering of Trajectories Using Continuous Dynamic Time Warping

TL;DR

This paper introduces a novel clustering method for trajectories using a continuous dynamic time warping (CDTW) measure, providing a practical algorithm for CDTW and a new center-based clustering approach that is robust to outliers.

Contribution

It develops the first approximation algorithm for CDTW and a new trajectory clustering algorithm that restricts center complexity and improves robustness.

Findings

Effective approximation algorithm for CDTW.

First trajectory clustering method using CDTW.

Demonstrated robustness and practicality through experiments.

Abstract

Due to the massively increasing amount of available geospatial data and the need to present it in an understandable way, clustering this data is more important than ever. As clusters might contain a large number of objects, having a representative for each cluster significantly facilitates understanding a clustering. Clustering methods relying on such representatives are called center-based. In this work we consider the problem of center-based clustering of trajectories. In this setting, the representative of a cluster is again a trajectory. To obtain a compact representation of the clusters and to avoid overfitting, we restrict the complexity of the representative trajectories by a parameter l. This restriction, however, makes discrete distance measures like dynamic time warping (DTW) less suited. There is recent work on center-based clustering of trajectories with a continuous distance measure, namely, the Fr\'echet distance. While the Fr\'echet distance allows for restriction of the center complexity, it can also be sensitive to outliers, whereas averaging-type distance measures, like DTW, are less so. To obtain a trajectory clustering algorithm that allows restricting center complexity and is more robust to outliers, we propose the usage of a continuous version of DTW as distance measure, which we call continuous dynamic time warping (CDTW). Our contribution is twofold: 1. To combat the lack of practical algorithms for CDTW, we develop an approximation algorithm that computes it. 2. We develop the first clustering algorithm under this distance measure and show a practical way to compute a center from a set of trajectories and subsequently iteratively improve it. To obtain insights into the results of clustering under CDTW on practical data, we conduct extensive experiments.