English

Iterative Methods for Computing the T-Square Root of Third-Order Tensors

Numerical Analysis 2026-05-15 v1 Numerical Analysis

Abstract

We develop and analyze iterative methods for computing the principal square root of third-order tensors under the T-product framework. Tensor extensions of the Newton iteration (quadratic convergence) and the Denman--Beavers iteration (geometric convergence with simultaneous computation of the inverse square root) are proposed, with rigorous convergence guarantees established via the Fourier-domain block-diagonalization of the T-product. We apply these methods to image processing, introducing Tensor Decorrelated Grayscale conversion, T-Whitening, and optimal color transfer under the T-product geometry. We also formulate the Tensor Bures--Wasserstein distance and prove it defines a valid metric on the space of T-positive definite tensors. Numerical experiments confirm rapid convergence and demonstrate that the proposed tensor-based techniques offer improved structural preservation and cross-channel decorrelation compared to classical methods.

Keywords

Cite

@article{arxiv.2605.14748,
  title  = {Iterative Methods for Computing the T-Square Root of Third-Order Tensors},
  author = {Hemant Sharma and Nachiketa Mishra},
  journal= {arXiv preprint arXiv:2605.14748},
  year   = {2026}
}