Sum-Rate Capacity for Symmetric Gaussian Multiple Access Channels with Feedback
arXiv:1811.09525
Abstract
The feedback sum-rate capacity is established for the symmetric $J$-user Gaussian multiple-access channel (GMAC). The main contribution is a converse bound that combines the dependence-balance argument of Hekstra and Willems (1989) with a variant of the factorization of a convex envelope of Geng and Nair (2014). The converse bound matches the achievable sum-rate of the Fourier-Modulated Estimate Correction strategy of Kramer (2002).
16 pages, 2 figures, published in International Symposium on Information Theory (ISIT) 2018