Transmit power minimization for the Z Interference Channel

We study transmit power minimization in the two-user Z Interference Channel (ZIC). When the interference link gain is strong, the capacity of the ZIC has been fully characterized. For this strong interference regime, we derive the closed-form solution of the minimum required transmit power to achieve a given rate pair, and show that the resulting power allocation between the two users is not necessarily unique. When the interference link gain is weak, the capacity of the ZIC is still an open problem to date. For this weak interference regime, we develop an inner and outer bound for the required transmit power to achieve a given rate pair, and characterize the constant power ratio relation between the two bounds. In contrast to the strong interference case, rate splitting is necessary for power minimization in this regime. The optimal power-minimizing rate splitting solution is then derived, and performance in terms of total transmit power required for a given rate pair is analyzed.

[1]  Mehul Motani,et al.  Capacity Theorems for the “Z” Channel , 2007, IEEE Transactions on Information Theory.

[2]  Te Sun Han,et al.  A new achievable rate region for the interference channel , 1981, IEEE Trans. Inf. Theory.

[3]  Hua Wang,et al.  Gaussian Interference Channel Capacity to Within One Bit , 2007, IEEE Transactions on Information Theory.

[4]  Andrea J. Goldsmith,et al.  The "Z" channel , 2003, GLOBECOM '03. IEEE Global Telecommunications Conference (IEEE Cat. No.03CH37489).

[5]  Gerhard Kramer,et al.  Outer bounds on the capacity of Gaussian interference channels , 2004, IEEE Transactions on Information Theory.

[6]  Shlomo Shamai,et al.  Capacity Bounds and Exact Results for the Cognitive Z-Interference Channel , 2013, IEEE Transactions on Information Theory.

[7]  Nan Liu,et al.  On the capacity region of the Gaussian Z-channel , 2004, IEEE Global Telecommunications Conference, 2004. GLOBECOM '04..