TY - JOUR
T1 - On the robustness of lattice interference alignment
AU - Ordentlich, Or
AU - Erez, Uri
PY - 2013
Y1 - 2013
N2 - A static (constant channel gains) real K-user interference channel is considered, where all interference (cross) channel gains are integers. For such channels, previous results demonstrate that the number of degrees of freedom is very sensitive to slight variations in the direct channel gains. In this paper, we derive an achievable rate region for such channels that is valid for finite SNR. At moderate values of SNR, the derived rate region is robust to slight variations in the direct channel gains. At asymptotic high SNR conditions, known results on the degrees of freedom are recovered. The new rate region is based on lattice interference alignment. The result is established via a new coding theorem for the two-user Gaussian multiple-access channel where both users use a single linear code.
AB - A static (constant channel gains) real K-user interference channel is considered, where all interference (cross) channel gains are integers. For such channels, previous results demonstrate that the number of degrees of freedom is very sensitive to slight variations in the direct channel gains. In this paper, we derive an achievable rate region for such channels that is valid for finite SNR. At moderate values of SNR, the derived rate region is robust to slight variations in the direct channel gains. At asymptotic high SNR conditions, known results on the degrees of freedom are recovered. The new rate region is based on lattice interference alignment. The result is established via a new coding theorem for the two-user Gaussian multiple-access channel where both users use a single linear code.
KW - Interference alignment
KW - interference channel
KW - linear codes
KW - multiple-access channel (MAC)
UR - http://www.scopus.com/inward/record.url?scp=84876767902&partnerID=8YFLogxK
U2 - 10.1109/TIT.2012.2235523
DO - 10.1109/TIT.2012.2235523
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AN - SCOPUS:84876767902
SN - 0018-9448
VL - 59
SP - 2735
EP - 2759
JO - IEEE Transactions on Information Theory
JF - IEEE Transactions on Information Theory
IS - 5
M1 - 6423916
ER -