Forrelation is Extremally Hard
Abstract
The Forrelation problem is a central problem that demonstrates an exponential separation between quantum and classical capabilities. In this problem, given query access to -bit Boolean functions and , the goal is to estimate the Forrelation function , which measures the correlation between and the Fourier transform of . In this work we provide a new linear algebraic perspective on the Forrelation problem, as opposed to prior analytic approaches. We establish a connection between the Forrelation problem and bent Boolean functions and through this connection, analyze an extremal version of the Forrelation problem where the goal is to distinguish between extremal instances of Forrelation, namely with and . We show that this problem can be solved with one quantum query and success probability one, yet requires classical randomized queries, even for algorithms with a one-third failure probability, highlighting the remarkable power of one exact quantum query. We also study a restricted variant of this problem where the inputs are computable by small classical circuits and show classical hardness under cryptographic assumptions.
Keywords
Cite
@article{arxiv.2508.02514,
title = {Forrelation is Extremally Hard},
author = {Uma Girish and Rocco Servedio},
journal= {arXiv preprint arXiv:2508.02514},
year = {2025}
}
Comments
Accepted as a talk at TQC 2025