The content discusses the use of rigid transformations in stabilizing lower dimensional spaces for subsurface uncertainty quantification. It explores the challenges of high-dimensional data in spatial systems, the importance of dimensionality reduction, and the application of metric-multidimensional scaling (MDS) in subsurface datasets. The proposed workflow is demonstrated with synthetic and real subsurface datasets, showcasing the effectiveness of stabilizing solutions for different sample sizes and predictor features. The methodology involves standardizing predictor features, computing dissimilarity matrices, performing metric MDS, applying rigid transformations, and evaluating model accuracy through normalized stress metrics. The results highlight the stability achieved by the proposed workflow in visualizing uncertainty space and tracking out-of-sample points in lower dimensional spaces.
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by Ademide O. M... a las arxiv.org 03-13-2024
https://arxiv.org/pdf/2308.08079.pdfConsultas más profundas