A Simple Capacity Lower Bound for Communication with Superimposed Pilots

TL;DR

This paper introduces a simple, analytical lower bound on mutual information for noncoherent Gaussian fading channels using superimposed pilots, effective even in fast fading scenarios where traditional pilots fail.

Contribution

It provides a novel closed-form lower bound for noncoherent communication with superimposed pilots, including optimal power allocation and extensions to MIMO systems.

Findings

Bound remains positive in fast fading regimes.

Optimal pilot power fraction tends to 0.5 at low SNR.

Extension to MIMO and comparison with orthogonal pilots.

Abstract

We present a novel closed-form lower bound on the Gaussian-input mutual information for noncoherent communication (i.e., in which neither transmitter nor receiver are cognizant of the fading state) over a frequency-flat fading channel with additive noise. Our bound yields positive (non-trivial) values even in the most challenging case of zero-mean fast fading, a regime in which the conventional approach of orthogonal time-multiplexed pilots is unavailing and for which, to the best of the author's knowledge, no simple analytical bound is known. Its derivation relies on endowing the transmit signal with a non-zero mean, which can be interpreted as a pilot symbol that is additively superimposed onto the information-bearing Gaussian signal. The optimal fraction of transmit power that one should dedicate to this pilot is computed in closed form and shown to tend to one half at low SNR and to a limit above $2-\sqrt{2} \approx 0.586$ at high SNR. We further show how one can refine the bound for the general case of non-zero mean fading. Finally, we state an extension of our bound to the MIMO setting and apply it to compare superimposed vs. orthogonal pilots on the SISO Rayleigh block fading channel.