Time-varying Vector Field Compression with Preserved Critical Point Trajectories

TL;DR

This paper introduces a lossy compression method for time-varying vector fields that preserves all critical-point trajectories, significantly improving compression ratios while maintaining key topological features.

Contribution

It extends critical point preservation theory to trajectories, introduces a semi-Lagrange predictor, and demonstrates superior compression performance on scientific datasets.

Findings

Achieves up to 124.48X compression ratio

Preserves all critical-point trajectories

Outperforms existing lossy and lossless compressors

Abstract

Scientific simulations and observations are producing vast amounts of time-varying vector field data, making it hard to store them for archival purposes and transmit them for analysis. Lossy compression is considered a promising approach to reducing these data because lossless compression yields low compression ratios that barely mitigate the problem. However, directly applying existing lossy compression methods to timevarying vector fields may introduce undesired distortions in critical-point trajectories, a crucial feature that encodes key properties of the vector field. In this work, we propose an efficient lossy compression framework that exactly preserves all critical-point trajectories in time-varying vector fields. Our contributions are threefold. First, we extend the theory for preserving critical points in space to preserving critical-point trajectories in space-time, and develop a compression framework to realize the functionality. Second, we propose a semi-Lagrange predictor to exploit the spatiotemporal correlations in advectiondominated regions, and combine it with the traditional Lorenzo predictor for improved compression efficiency. Third, we evaluate our method against state-of-the-art lossy and lossless compressors using four real-world scientific datasets. Experimental results demonstrate that the proposed method delivers up to 124.48X compression ratios while effectively preserving all critical-point trajectories. This compression ratio is up to 56.07X higher than that of the best lossless compressors, and none of the existing lossy compressors can preserve all critical-point trajectories at similar compression ratios.