Feedback Capacity of the Continuous-Time ARMA(1,1) Gaussian Channel

Abstract

We consider the continuous-time ARMA(1,1) Gaussian channel and derive its feedback capacity in closed form. More specifically, the channel is given by y(t) =x(t) +z(t), where the channel input \x(t) \ satisfies average power constraint P and the noise \z(t)\ is a first-order autoregressive moving average (ARMA(1,1)) Gaussian process satisfying z(t)+ z(t)=(+λ)w(t)+w(t), where >0,~λ∈R and \w(t) \ is a white Gaussian process with unit double-sided spectral density. We show that the feedback capacity of this channel is equal to the unique positive root of the equation P(x+)2 = 2x(x+ +λ)2 when -2<λ<0 and is equal to P/2 otherwise. Among many others, this result shows that, as opposed to a discrete-time additive Gaussian channel, feedback may not increase the capacity of a continuous-time additive Gaussian channel even if the noise process is colored. The formula enables us to conduct a thorough analysis of the effect of feedback on the capacity for such a channel. We characterize when the feedback capacity equals or doubles the non-feedback capacity; moreover, we disprove continuous-time analogues of the half-bit bound and Cover's 2P conjecture for discrete-time additive Gaussian channels.