Abstract
The pathloss exponent and the variance of the large-scale fading are two parameters that are of great importance when modeling or characterizing wireless propagation channels. The pathloss is typically modeled using a single-slope log-distance power law model, whereas the large-scale fading is modeled using a log-normal distribution. In practice, the received signal is affected by noise and it might also be corrupted by interference from other active transmitters that are transmitting in the same frequency band. Estimating the pathloss exponent and large scale fading without considering the effects of the noise and interference, can lead to erroneous results. In this paper, we show that the path loss and large scale fading estimates can be improved if the effects of samples located below the noise floor are taken into account in the estimation step. When the number of such samples is known, then the pathloss exponent and standard deviation of the large scale fading can be iteratively computed using maximum likelihood estimation from incomplete data via the expectation maximization (EM) algorithm. Alternatively, if the number of samples below the noise floor is unknown, we show that the pathloss and large scale fading parameters can be estimated based on a likelihood expression for a truncated normal distribution.
Original language | English |
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Number of pages | 5 |
Publication status | Unpublished - 2014 |
Event | COST IC1004 10th Management Committee and Scientific Meeting - Aalborg, Denmark Duration: 2014 May 26 → 2014 May 28 |
Conference
Conference | COST IC1004 10th Management Committee and Scientific Meeting |
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Country/Territory | Denmark |
City | Aalborg |
Period | 2014/05/26 → 2014/05/28 |
Subject classification (UKÄ)
- Electrical Engineering, Electronic Engineering, Information Engineering