In this paper we study two one-parameter families of random band Toeplitz matrices: An(t)=bn1(ai−jδ∣i−j∣≤[bnt])i,j=1nandBn(t)=bn1(ai−j(t)δ∣i−j∣≤bn)i,j=1n where 1. a0=0, {a1,a2,..} in An(t) are independent random variables and a−i=ai 2. a0(t)=0, {a1(t),a2(t),...} in Bn(t) are independent copies of the standard Brownian motion at time t and a−i(t)=ai(t). As t varies, the empirical measures μ(An(t)) and μ(Bn(t)) are measure valued stochastic processes. The purpose of this paper is to study the fluctuations of μ(An(t)) and μ(Bn(t)) as n goes to ∞. Given a monomial f(x)=xp with p≥2, the corresponding rescaled fluctuations of μ(An(t)) and μ(Bn(t)) are bn(∫f(x)dμ(An(t))−E[∫f(x)dμ(An(t))])=nbn(tr(An(t)p)−E[tr(An(t)p)]),(1)bn(∫f(x)dμ(Bn(t))−E[∫f(x)dμ(Bn(t))])=nbn(tr(Bn(t)p)−E[tr(Bn(t)p)])(2) respectively. We will prove that (1) and (2) converge to centered Gaussian families {Zp(t)} and {Wp(t)} respectively. The covariance structure E[Zp(t1)Zq(t2)] and E[Wp(t1)Wq(t2)] are obtained for all p,q≥2; t1,t2≥0, and are both homogeneous polynomials of t1 and t2 for fixed p,q. In particular, Z2(t) is the Brownian motion and Z3(t) is the same as W2(t) up to a constant. The main method of this paper is the moment method.
@article{arxiv.1412.5232,
title = {On Fluctuations for Random Band Toeplitz Matrices},
author = {Yiting Li and Xin Sun},
journal= {arXiv preprint arXiv:1412.5232},
year = {2015}
}
Comments
25 pages. To appear in Random Matrices: Theory and Applications