English

Rates of estimation for high-dimensional multi-reference alignment

Statistics Theory 2023-08-29 v2 Applications Statistics Theory

Abstract

We study the continuous multi-reference alignment model of estimating a periodic function on the circle from noisy and circularly-rotated observations. Motivated by analogous high-dimensional problems that arise in cryo-electron microscopy, we establish minimax rates for estimating generic signals that are explicit in the dimension KK. In a high-noise regime with noise variance σ2K\sigma^2 \gtrsim K, for signals with Fourier coefficients of roughly uniform magnitude, the rate scales as σ6\sigma^6 and has no further dependence on the dimension. This rate is achieved by a bispectrum inversion procedure, and our analyses provide new stability bounds for bispectrum inversion that may be of independent interest. In a low-noise regime where σ2K/logK\sigma^2 \lesssim K/\log K, the rate scales instead as Kσ2K\sigma^2, and we establish this rate by a sharp analysis of the maximum likelihood estimator that marginalizes over latent rotations. A complementary lower bound that interpolates between these two regimes is obtained using Assouad's hypercube lemma. We extend these analyses also to signals whose Fourier coefficients have a slow power law decay.

Keywords

Cite

@article{arxiv.2205.01847,
  title  = {Rates of estimation for high-dimensional multi-reference alignment},
  author = {Zehao Dou and Zhou Fan and Harrison Zhou},
  journal= {arXiv preprint arXiv:2205.01847},
  year   = {2023}
}

Comments

56 pages

R2 v1 2026-06-24T11:06:36.456Z