A Framework for Computational Lower Bounds in Nontrivial Norm Approximation
Abstract
In this note, we propose a framework for proving computational lower bounds in norm approximation by leveraging a reverse detection--estimation gap. The starting point is a testing problem together with an estimator whose error is significantly smaller than the corresponding computational detection threshold. We show that such a gap yields a lower bound on the approximation distortion achievable by any algorithm in the underlying computational class. In this way, reverse detection--estimation gaps can be turned into a general mechanism for certifying the hardness of approximating nontrivial norms. We apply this framework to the spectral norm of order- symmetric tensors in . Using a recently established low-degree hardness result for detecting nonzero high-order cumulant tensors, together with an efficiently computable estimator whose error is below the low-degree detection threshold, we prove that any degree- low-degree algorithm with must incur distortion at least for the tensor spectral norm. Under the low-degree conjecture, the same conclusion extends to all polynomial-time algorithms. In several important settings, this lower bound matches the best known upper bounds up to polylogarithmic factors, suggesting that the exponent captures a genuine computational barrier. Our results provide evidence that the difficulty of approximating tensor spectral norm is not merely an artifact of existing techniques, but reflects a broader computational barrier.
Keywords
Cite
@article{arxiv.2604.00966,
title = {A Framework for Computational Lower Bounds in Nontrivial Norm Approximation},
author = {Runshi Tang and Yuefeng Han and Anru R. Zhang},
journal= {arXiv preprint arXiv:2604.00966},
year = {2026}
}