I'm trying to reproduce the results of a paper on Device-to-Device Communication, channel assignment and mode selection (G. Yu, L. Xu, D. Feng, R. Yin, G. Y. Li and Y. Jiang, "Joint Mode Selection and Resource Allocation for Device-to-Device Communications," Nov. 2014.).
I have a couple of questions on the noise spectral density, how to generate the channel taps, and finally the throughput of the entire system.
It is mentioned the following in the paper:
"All links are assumed to experience independent block fading. Hence, the instantaneous channel gain of the interference link between CU m and the receiver of D2D pair k can be expressed as $$h_{k,m} = Gβ_{k,m}d^{−\alpha}_{k, m},$$ where G is the path loss constant, α is the path loss exponent, $β_{k,m}$ denotes the channel fading component, and $d_{k,m}$ is the distance between CU m and the receiver of D2D pair k. Similarly, we can express the channel gain between CU m and the eNB as $h^C_{m,B}$, the channel gain between D2D pair k as $h^D_k$, and the channel gain between the transmitter of D2D pair k and the eNB as $h^D_{k,B}$."
Towards the last section, we have the following relevant simulation parameters:
- Noise Spectral Density: -174 dBm / Hz.
- Path Loss Model (for Cellular Links): $128.1 + 37.6 \times \log_{10}(d[km])$.
- Log Normal Shadowing: 10 dB.
- Uplink Bandwidth: 3 MHz.
Now my questions are related to the channel model:
- How do I convert from the Path Loss Model combined with the Shadowing Effect of 10 dB to the first mentioned equation ($h_{k,m} = Gβ_{k,m}d^{−\alpha}_{k, m}$) ?
- When I convert the noise spectral density from dBm/Hz to dBm, should I divide the value by the number of Uplink channels, which is 20 ? And if so, should I do that in the dB or Watts units ?
