Computational and Statistical Guarantees for Tensor-on-Tensor Regression with Tensor Train Decomposition

TL;DR

This paper provides theoretical error bounds and efficient algorithms for tensor-on-tensor regression using tensor train decomposition, addressing computational challenges and ensuring reliable performance under the RIP condition.

Contribution

It offers the first comprehensive theoretical analysis and convergence guarantees for TT-based ToT regression algorithms, bridging the gap between theory and practice.

Findings

Error bounds polynomial in tensor order

Linear convergence of IHT and RGD algorithms

Efficient algorithms with spectral initialization

Abstract

Recently, a tensor-on-tensor (ToT) regression model has been proposed to generalize tensor recovery, encompassing scenarios like scalar-on-tensor regression and tensor-on-vector regression. However, the exponential growth in tensor complexity poses challenges for storage and computation in ToT regression. To overcome this hurdle, tensor decompositions have been introduced, with the tensor train (TT)-based ToT model proving efficient in practice due to reduced memory requirements, enhanced computational efficiency, and decreased sampling complexity. Despite these practical benefits, a disparity exists between theoretical analysis and real-world performance. In this paper, we delve into the theoretical and algorithmic aspects of the TT-based ToT regression model. Assuming the regression operator satisfies the restricted isometry property (RIP), we conduct an error analysis for the solution to a constrained least-squares optimization problem. This analysis includes upper error bound and minimax lower bound, revealing that such error bounds polynomially depend on the order $N+M$. To efficiently find solutions meeting such error bounds, we propose two optimization algorithms: the iterative hard thresholding (IHT) algorithm (employing gradient descent with TT-singular value decomposition (TT-SVD)) and the factorization approach using the Riemannian gradient descent (RGD) algorithm. When RIP is satisfied, spectral initialization facilitates proper initialization, and we establish the linear convergence rate of both IHT and RGD.