Improved Computational Lower Bound of Estimation for Multi-Frequency Group Synchronization

Abstract

We study the computational phase transition in a multi-frequency group synchronization problem, where pairwise relative measurements of group elements are observed across multiple frequency channels and corrupted by Gaussian noise. Using the framework of low-degree polynomial algorithms, we analyze the task of estimating the structured signal in such observations. We show that, assuming the low-degree heuristic, in synchronization models over the circle group SO(2), a simple spectral method is computationally optimal among all polynomial-time estimators when the number of frequencies satisfies L=no(1). This significantly extends prior work KBK24+, which only applied to a fixed constant number of frequencies. Together with known upper bounds on the statistical threshold PWBM18a, our results establish the existence of a statistical-to-computational gap in this model when the number of frequencies is sufficiently large.