Uncertainty Visualization of Transport Variance in a Time-Varying Ensemble Vector Field

Ren, Ke; Qu, Dezhan; Xu, Shuai; Jiao, Xufeng; Tai, Liang; Zhang, Huijie

doi:10.3390/ijgi9010019

Cited by 4 publications

(2 citation statements)

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“…The result highlighted the relation of the trained model's performance and flow features in the domain. The error for each trajectory was measured using the AEDR metric proposed by [46]. We observed reconstruction errors were higher in regions with greater separation in the flow field, i.e., regions with higher FTLE values.…”

Section: Impact Of Number Of Seedsmentioning

confidence: 95%

“…To measure the accuracy of new particle trajectories inferred by the model, we used a robust and accurate metric called the adaptive edit distance on real sequences (AEDR) proposed by [46] to measure pathline uncertainty. The metric uses the L1 norm divided by a threshold distance to quantify the local error of each interpolated location, accumulates error along the trajectory, and produces an average across all the interpolated locations.…”

Section: Inference Processmentioning

confidence: 99%

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Exploratory Lagrangian-Based Particle Tracing Using Deep Learning

Han,

Sane,

Johnson

2021

Preprint

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Time-varying vector fields produced by computational fluid dynamics simulations are often prohibitively large and pose challenges for accurate interactive analysis and exploration. To address these challenges, reduced Lagrangian representations have been increasingly researched as a means to improve scientific time-varying vector field exploration capabilities. This paper presents a novel deep neural network-based particle tracing method to explore time-varying vector fields represented by Lagrangian flow maps. In our workflow, in situ processing is first utilized to extract Lagrangian flow maps, and deep neural networks then use the extracted data to learn flow field behavior. Using a trained model to predict new particle trajectories offers a fixed small memory footprint and fast inference. To demonstrate and evaluate the proposed method, we perform an in-depth study of performance using a well-known analytical data set, the Double Gyre. Our study considers two flow map extraction strategies as well as the impact of the number of training samples and integration durations on efficacy, evaluates multiple sampling options for training and testing, and informs hyperparameter settings. Overall, we find our method requires a fixed memory footprint of 10.5 MB to encode a Lagrangian representation of a time-varying vector field while maintaining accuracy. For post hoc analysis, loading the trained model costs only two seconds, significantly reducing the burden of I/O when reading data for visualization. Moreover, our parallel implementation can infer one hundred locations for each of two thousand new pathlines across the entire temporal resolution in 1.3 seconds using one NVIDIA Titan RTX GPU.

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Section: Impact Of Number Of Seedsmentioning

confidence: 95%

Section: Inference Processmentioning

confidence: 99%