Linear-Scaling Tensor Train Sketching
Abstract
We introduce the TTStack sketch, a structured random projection tailored to the tensor train (TT) format that unifies existing TT-adapted sketching operators. By varying two integer parameters and , TTStack interpolates between the Khatri-Rao sketch () and the Gaussian TT sketch (). We prove that TTStack satisfies an oblivious subspace embedding (OSE) property with parameters and , and an oblivious subspace injection (OSI) property under the condition and . Both guarantees depend only linearly on the tensor order and on the subspace dimension , in contrast to prior constructions that suffer from exponential scaling in . As direct consequences, we derive quasi-optimal error bounds for the QB factorization and randomized TT rounding. The theoretical results are supported by numerical experiments on synthetic tensors, Hadamard products, and a quantum chemistry application.
Cite
@article{arxiv.2603.11009,
title = {Linear-Scaling Tensor Train Sketching},
author = {Paul Cazeaux and Mi-Song Dupuy and Rodrigo Figueroa Justiniano},
journal= {arXiv preprint arXiv:2603.11009},
year = {2026}
}