Wimax standards and Security The Wimax

p(x) = ¹ × exp ^{−(x − x)}2

(5.4)

σ^√2π
2σ²

With this Gaussian distribution model, the probability that the received power x at a distance d exceeds a threshold x₀ (the receiver threshold that provides an acceptable signal) is given by Ref. 22.



2

σ

2
P(x ≥ x₀) = ¹ erfc ^x0 √^{− x} (5.5)
where erfc is the complementary error function.^∗ Equation 5.5 is used to choose a fade margin, or excess margin, in a link budget to obtain a tar- get service reliability (percentage of acceptable signal at the edge of planned coverage). Without that excess margin, link budgets and propagation models only yield a median propagation loss, corresponding to 50% edge coverage reliability.^†

=

=
The mean of log-normal shadowing is usually incorporated in path loss model and its standard deviation σ is typically estimated by empirical mea- surements. Commonly accepted values for σ are between 6 and 12 dB. Measured values of σ seem to display Gaussian distribution as well and depend on: the radio frequency, the type of environment (rural, suburban, or urban), and base station and subscriber station height. Reports may be found in the literature [20–29] and are summarized in Table 5.1. The choice is somewhat arbitrary, but given the above experimental data we chose to follow an empirical value for suburban environment of σ 9.6 dB (e.g., for terrain category B in Ref. 13) and use that same estimate σ 9.6 dB for 3.5 GHz and 5.8 GHz. We then chose a fade margin or excess margin for a certain ser- vice reliability. For instance, service providers tend to impose a requirement of 90% edge coverage, which when following Jakes’ method [22] yields a fade margin of 12.3 dB.


^∗ The complementary error function is defined as erfc 1 erf, where erf is the error function erf(x) = ^{√2 ¸ x} e^−u2 du.

= −

π

0
^† Indeed, setting the excess margin to x₀ − m = 0 yields a coverage probability of P(x ≥ x) = 50%,
since erfc(0) = 1.