Identification for Colored Gaussian Channels

Abstract

We study the identification capacity of discrete-time Gaussian channels impaired by correlated noise and inter-symbol interference (ISI). Our analysis is formulated for deterministic encoding functions subject to a peak power constraint and colored noise whose covariance matrix features a polynomially bounded singular value spectrum, i.e., [n-μ , nμ/2] where n is the codeword length and μ∈ [0,1/2) is the spectrum rate. A central result establishes that, even when the ISI memory length grows sub-linearly with n, i.e., nκ where κ∈ [0,1/2) and κ+ μ∈ [0,1/2), the codebook size continues to exhibit super-exponential growth in n, i.e., 2(n n)R, with R representing the associated coding rate. Moreover, by employing the well-known Mahalanobis-distance decoder induced by colored Gaussian noise statistics, we characterize bounds on the identification capacity, with the resulting bounds parameterized by κ and μ.