Related papers: Visual Analytics Using Tensor Unified Linear Comparative Analysis

Visual Analytics Using Tensor Unified Linear Comparative Analysis

URL: http://arxiv.org/abs/2507.19988v1
Date: Sat, 26 Jul 2025 15:54:12 GMT
Title: Visual Analytics Using Tensor Unified Linear Comparative Analysis
Authors: Naoki Okami, Kazuki Miyake, Naohisa Sakamoto, Jorji Nonaka, Takanori Fujiwara,
Abstract summary: We introduce a new tensor decomposition method, named tensor unified linear comparative analysis (TULCA)<n>TULCA integrates discriminant analysis and contrastive learning schemes for tensor decomposition, enabling flexible comparison of tensors.<n>We also introduce an effective method to visualize a core tensor extracted from TULCA into a set of 2D visualizations.
Score: 3.670008893193884
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Comparing tensors and identifying their (dis)similar structures is fundamental in understanding the underlying phenomena for complex data. Tensor decomposition methods help analysts extract tensors' essential characteristics and aid in visual analytics for tensors. In contrast to dimensionality reduction (DR) methods designed only for analyzing a matrix (i.e., second-order tensor), existing tensor decomposition methods do not support flexible comparative analysis. To address this analysis limitation, we introduce a new tensor decomposition method, named tensor unified linear comparative analysis (TULCA), by extending its DR counterpart, ULCA, for tensor analysis. TULCA integrates discriminant analysis and contrastive learning schemes for tensor decomposition, enabling flexible comparison of tensors. We also introduce an effective method to visualize a core tensor extracted from TULCA into a set of 2D visualizations. We integrate TULCA's functionalities into a visual analytics interface to support analysts in interpreting and refining the TULCA results. We demonstrate the efficacy of TULCA and the visual analytics interface with computational evaluations and two case studies, including an analysis of log data collected from a supercomputer.

Related papers

Score-Based Model for Low-Rank Tensor Recovery [49.158601255093416]
Low-rank tensor decompositions (TDs) provide an effective framework for multiway data analysis.<n>Traditional TD methods rely on predefined structural assumptions, such as CP or Tucker decompositions.<n>We propose a score-based model that eliminates the need for predefined structural or distributional assumptions.
arXiv Detail & Related papers (2025-06-27T15:05:37Z)
Hyperspectral Image Spectral-Spatial Feature Extraction via Tensor Principal Component Analysis [41.71615165526371]
This paper addresses the challenge of spectral-spatial feature extraction for hyperspectral image classification.<n>The proposed approach incorporates circular convolution into a tensor structure to effectively capture and integrate both spectral and spatial information.<n>Building upon this framework, the traditional Principal Component Analysis (PCA) technique is extended to its tensor-based counterpart, referred to as Principal Component Analysis (TPCA)
arXiv Detail & Related papers (2024-12-08T21:52:09Z)
High-Dimensional Tensor Discriminant Analysis with Incomplete Tensors [5.745276598549783]
We introduce a novel approach to tensor classification with incomplete data, framed within high-dimensional linear discriminant analysis. Our method demonstrates excellent performance in simulations and real data analysis, even with significant proportions of missing data.
arXiv Detail & Related papers (2024-10-18T18:00:16Z)
Interpretable Multi-View Clustering Based on Anchor Graph Tensor Factorization [64.00146569922028]
Multi-view clustering methods based on anchor graph factorization lack adequate cluster interpretability for the decomposed matrix. We address this limitation by using non-negative tensor factorization to decompose an anchor graph tensor that combines anchor graphs from multiple views.
arXiv Detail & Related papers (2024-04-01T03:23:55Z)
Error Analysis of Tensor-Train Cross Approximation [88.83467216606778]
We provide accuracy guarantees in terms of the entire tensor for both exact and noisy measurements. Results are verified by numerical experiments, and may have important implications for the usefulness of cross approximations for high-order tensors.
arXiv Detail & Related papers (2022-07-09T19:33:59Z)
High-Order Multilinear Discriminant Analysis via Order-$\textit{n}$ Tensor Eigendecomposition [0.0]
This paper presents a new approach to tensor-based multilinear discriminant analysis referred to as High-Order Multilinear Discriminant Analysis (HOMLDA) Our proposed approach provides improved classification performance with respect to the current Tucker decomposition-based supervised learning methods.
arXiv Detail & Related papers (2022-05-18T19:49:54Z)
Dynamically-Scaled Deep Canonical Correlation Analysis [77.34726150561087]
Canonical Correlation Analysis (CCA) is a method for feature extraction of two views by finding maximally correlated linear projections of them. We introduce a novel dynamic scaling method for training an input-dependent canonical correlation model.
arXiv Detail & Related papers (2022-03-23T12:52:49Z)
Explaining dimensionality reduction results using Shapley values [0.0]
Dimensionality reduction (DR) techniques have been consistently supporting high-dimensional data analysis in various applications. Current literature approaches designed to interpret DR techniques do not explain the features' contributions well since they focus only on the low-dimensional representation or do not consider the relationship among features. This paper presents ClusterShapley to address these problems, using Shapley values to generate explanations of dimensionality reduction techniques and interpret these algorithms using a cluster-oriented analysis.
arXiv Detail & Related papers (2021-03-09T19:28:10Z)
Stochastic Approximation for Online Tensorial Independent Component Analysis [98.34292831923335]
Independent component analysis (ICA) has been a popular dimension reduction tool in statistical machine learning and signal processing. In this paper, we present a by-product online tensorial algorithm that estimates for each independent component.
arXiv Detail & Related papers (2020-12-28T18:52:37Z)
Neural Dynamic Mode Decomposition for End-to-End Modeling of Nonlinear Dynamics [49.41640137945938]
We propose a neural dynamic mode decomposition for estimating a lift function based on neural networks. With our proposed method, the forecast error is backpropagated through the neural networks and the spectral decomposition. Our experiments demonstrate the effectiveness of our proposed method in terms of eigenvalue estimation and forecast performance.
arXiv Detail & Related papers (2020-12-11T08:34:26Z)

This list is automatically generated from the titles and abstracts of the papers in this site.