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Autori principali: Karakasis, Paris A., Sidiropoulos, Nicholas D.
Natura: Preprint
Pubblicazione: 2026
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Accesso online:https://arxiv.org/abs/2601.14173
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author Karakasis, Paris A.
Sidiropoulos, Nicholas D.
author_facet Karakasis, Paris A.
Sidiropoulos, Nicholas D.
contents We study low-rank tensor-product B-spline (TPBS) models for regression tasks and investigate Dirichlet energy as a measure of smoothness. We show that TPBS models admit a closed-form expression for the Dirichlet energy, and reveal scenarios where perfect interpolation is possible with exponentially small Dirichlet energy. This renders global Dirichlet energy-based regularization ineffective. To address this limitation, we propose a novel regularization strategy based on local Dirichlet energies defined on small hypercubes centered at the training points. Leveraging pretrained TPBS models, we also introduce two estimators for inference from incomplete samples. Comparative experiments with neural networks demonstrate that TPBS models outperform neural networks in the overfitting regime for most datasets, and maintain competitive performance otherwise. Overall, TPBS models exhibit greater robustness to overfitting and consistently benefit from regularization, while neural networks are more sensitive to overfitting and less effective in leveraging regularization.
format Preprint
id arxiv_https___arxiv_org_abs_2601_14173
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Penalizing Localized Dirichlet Energies in Low Rank Tensor Products
Karakasis, Paris A.
Sidiropoulos, Nicholas D.
Machine Learning
We study low-rank tensor-product B-spline (TPBS) models for regression tasks and investigate Dirichlet energy as a measure of smoothness. We show that TPBS models admit a closed-form expression for the Dirichlet energy, and reveal scenarios where perfect interpolation is possible with exponentially small Dirichlet energy. This renders global Dirichlet energy-based regularization ineffective. To address this limitation, we propose a novel regularization strategy based on local Dirichlet energies defined on small hypercubes centered at the training points. Leveraging pretrained TPBS models, we also introduce two estimators for inference from incomplete samples. Comparative experiments with neural networks demonstrate that TPBS models outperform neural networks in the overfitting regime for most datasets, and maintain competitive performance otherwise. Overall, TPBS models exhibit greater robustness to overfitting and consistently benefit from regularization, while neural networks are more sensitive to overfitting and less effective in leveraging regularization.
title Penalizing Localized Dirichlet Energies in Low Rank Tensor Products
topic Machine Learning
url https://arxiv.org/abs/2601.14173