50                                     Autonomous Mobile Robots

                                2.4.1 RADAR Range Equation
                                According to the simple RADAR equation,  the returned powerP r isproportional
                                to the RCS of the object, σ  and inversely proportional to the fourth power of
                                range, R [21]. The simple RADAR range equation is formally written as

                                                                 2 2
                                                              P t G λ σ
                                                         P r =                             (2.7)
                                                                  3 4
                                                              (4π) R L
                                where P t is the RADAR’s transmitted power, G is the antenna gain, λ is the
                                wavelength (i.e., 3.89 mm in this case), and L the RADAR system losses. A high
                                pass filter (shown in Figure 2.2) is used to compensate for the R 4  drop in received
                                signal power. In an FMCW RADAR, closer objects produce signals with low
                                beat frequencies and vice-versa (Equation [2.5]). Therefore by attenuating low
                                frequencies and amplifying high frequencies, it is possible to correct the range-
                                based signal attenuation [18]. To compensate the returned power loss due to
                                increased range, the high pass filter is modeled in two ways:

                                    1. The bias in the received power spectra is estimated.
                                    2. By modeling the high pass filter with a gain of 60 dB/decade, instead
                                      of the usual 40 dB/decade, to comply with the characteristics of the
                                      particular RADAR used here.


                                   The aim of this is to give a constant received signal power with range. The
                                actual compensation which results in our system was shown in Figure 2.2 where
                                it can be seen that the ideal flat response is not achieved by the internal high
                                pass filter.


                                2.4.2 Interpretation of RADAR Noise
                                This section analyzes the sources of noise in MMW RADARs and quantifies
                                the noise power in the received range spectra (seen in Figure 2.3). In most robot
                                navigation formulations, observations must be predicted, and for the estimation
                                algorithms to run correctly, the actual observations are assumed to equal the
                                predictions, except that they are corrupted with Gaussian noise. It is therefore
                                the aim of this section to determine the type of noise distributions in the actual
                                received power and range values to determine how the predicted power–range
                                spectra can be used correctly in a robot navigation formulation.
                                   RADAR noise is the unwanted power that impedes the performance of
                                the RADAR. For the accurate prediction of range bins, the characterization of
                                noise is important. The two main components are thermal and phase noise.
                                Thermal noise affects the power reading while phase noise affects the range
                                estimate.




                                 © 2006 by Taylor & Francis Group, LLC



                                 FRANKL: “dk6033_c002” — 2006/3/31 — 17:29 — page 50 — #10