English

Spectral approximation for the separable covariance mixture model

Statistics Theory 2026-04-22 v2 Statistics Theory

Abstract

This paper introduces the separable covariance mixture model, which assumes a data-matrix YY to be of the form r=1RArXBr \sum\limits_{r=1}^R A_r X B_r for one random (d×n)(d \times n)-matrix XX with independent centered variance-one entries, and for two families of deterministic matrices A1,,ARCd×dA_1,\dots,A_R \in \mathbb{C}^{d \times d} and B1,,BRCn×nB_1,\dots,B_R \in \mathbb{C}^{n \times n}. Under certain assumptions, it is shown that the resolvents (1nYYzIdd)1(\frac{1}{n} Y Y^* - z \operatorname{Id}_d)^{-1} and (1nYYzIdn)1(\frac{1}{n} Y^* Y - z \operatorname{Id}_n)^{-1} respectively approximate the deterministic matrices 1z(Idd+r,s=1Rδr,s(B)(z)ArAs)1   and   1z(Idn+r,s=1Rδr,s(A)(z)BsBr)1 , -\frac{1}{z}\Big( \operatorname{Id}_d + \sum\limits_{r,s=1}^R \delta^{(B)}_{r,s}(z) A_{r} A_{s}^* \Big)^{-1} \ \ \text{ and } \ \ -\frac{1}{z}\Big( \operatorname{Id}_n + \sum\limits_{r,s=1}^R \delta^{(A)}_{r,s}(z) B_{s}^*B_{r} \Big)^{-1} \ , where δ(A),δ(B)CR×R\delta^{(A)}, \delta^{(B)} \in \mathbb{C}^{R \times R} are uniquely defined solutions to a certain dual system of equations. The results are non-asymptotic and do not require simultaneous diagonalizability of the families (Ar)rR(A_r)_{r \leq R} or (Br)rR(B_r)_{r \leq R}, as was required in previous works such as [Hazarika and Paul (2025)] or [Mei et al. (2023)]. An asymptotic application, which describes the limiting spectral distribution of the sample covariance matrix analogues 1nYY\frac{1}{n} Y Y^* or 1nYY\frac{1}{n} Y^* Y, is included.

Keywords

Cite

@article{arxiv.2604.18181,
  title  = {Spectral approximation for the separable covariance mixture model},
  author = {Ben Deitmar},
  journal= {arXiv preprint arXiv:2604.18181},
  year   = {2026}
}

Comments

96 pages, 2 figures

R2 v1 2026-07-01T12:18:15.109Z