Apparent in the figure is also the ACLR level, which is nearly the same at the edge of the main signal as the NPR signal in the middle. It is clear from this figure that ACP and NPR are closely related. Imagine, though, if the DUT is followed by a sharp channelizing filter; the ACLR would be removed by the filter and could not be used to determine the distortion but the NPR signal allows one to see the in‐channel distortion. NPR measurements are covered extensively in Chapter 8.
1.6.6 Error Vector Magnitude (EVM)
Error vector magnitude (EVM) is a figure of merit used in communications systems to describe the quality of a modulated signal compared to an idealized signal. In most cases, it is a measure in the so‐called IQ plane of the vector difference between the measured signal and the idealized signal, which is determined by recovering the modulation pattern from the measured signal and re‐creating the idealized signal. It is used when the errors are small and becomes inaccurate with large errors as the recovered signal may not be the correct signal when the EVM is quite large.
The sample point for determining the error is determined by the signaling method, and the idealized signal is time‐shifted to line up with the measured signal to find the difference at the sample point. In some signaling methods, the EVM is determined by taking the fast Fourier transform (FFT) of the modulated signal and idealized signal and measuring the vector difference in the frequency domain.
EVM is affected primarily by distortion of the channel (usually in the transmitter amplifier), nonuniform frequency response (ripples or roll‐off in the channel components), and noise in the system. For a transmitter component, which is the principal contributor to EVM, the noise contribution is generally not significant. In many modulation schemes, such as orthogonal frequency domain multiplexing (OFTM), the signal is broken into many narrow channels, such that the frequency response changes are small over each channel, and thus frequency flatness errors don't contribute to the EVM in these modulation schemes. In other cases, the measurement receiver has the ability to apply frequency response compensation, a kind‐of inverse filtering, to remove the effects of the nonideal frequency response. This is sometimes called equalization, and the EVM measurement is called equalized EVM. After equalization, the frequency response does not contribute significant errors to the EVM signal.
This leaves only distortion as the predominant contribution to EVM, and as such EVM has become a common figure of merit for distortion in these systems. EVM measurements generally require a full demodulation to evaluate the signal quality, and at this time such capabilities are not generally available in VNAs, but this is likely to change as EVM becomes a significant figure of merit in more systems.
Recently, several papers have been presented (Sombrin 2011; Freiberger et al. 2017) that demonstrate a corresponding relationship between EVM and NPR. These works are compelling and lead one to infer that with further development, the time is near when EVM can be determined without the need for full demodulation, as illustrated in Chapter 8.
1.7 Characteristics of Microwave Components
Microwave components differ from other electrical devices in a few respects. The principal discerning attribute is the fact that the components' size cannot be ignored. In fact, the size of many components is a significant portion of a wavelength at the frequency of interest. This size causes the phase of the signals incident on the device to vary across the device, implying that microwave devices must be treated as distributed devices. A second, related attribute is that the reference ground for the device is not defined by a point but is distributed as well. Indeed, in many cases the ground is not well defined. In some situations, grounds for a device are isolated by sufficient distance that signal propagation can occur from one device ground to another. Further, even if devices are defined as series only (with no ground contact), one must realize that there is always an earth ground available so there can always be some impedance to this ground. In practice, the earth ground is actually the chassis or package of the device, or a power or other ground plane on a printed circuit board (PCB).
Finally, only in microwave components can one find the concept of wave propagation. In waveguide components, there is no “signal” and no “ground.” Rather, a wave of electric‐magnetic (EM) field is guided into and out of the device without regard to a specific ground plane. For these devices, even the transmission structures, waveguide for example, are a large percentage of a signal wavelength. Common concepts such as impedance become ambiguous in the realm of waveguide measurements and must be treated with special care.
1.8 Passive Microwave Components
1.8.1 Cables, Connectors, and Transmission Lines
1.8.1.1 Cables
The simplest and most ubiquitous microwave components are transmission lines. These can be found in a variety of forms and applications, and they provide the essential glue that connects the components of a microwave system. RF and microwave cables are often the first exposure an engineer has to microwave components and transmission systems, the most widespread example being a coaxial cable used for cable television (CATV, aka Community Antenna TeleVison).
The key characteristics of coaxial cables are their impedance and loss. The characteristics of coaxial cables are often defined in terms of their equivalent distributed parameters (Magnusson 2001), as shown in Figure 1.11, described by the telegraphers' equation
(1.73)
(1.74)
where v(z), i(z) are the voltage and current along the transmission line, and r, l, g, c are the resistance, inductance, conductance, and capacitance per unit length.
Figure 1.11 A transmission line modeled as distributed elements.
For a lossless cable, the impedance can be computed as simply
(1.75)
but it becomes more complicated when loss is introduced, becoming
(1.76)
In many applications, the conductance of the cable is negligible, particularly at low frequencies, so that the only loss element is the resistance per unit length, yielding
Inspection of Eq. (1.77) shows that the impedance of a cable must increase as the frequency goes down toward DC. Figure 1.12 demonstrates this with a calculation the impedance of a nominal 75 Ω cable, with a 0.0001 Ω mm−1 loss and capacitance of 0.07 pF mm−1 (typical for RG 6 CATV coax). In this case, the impedance deviates from the expected value at 300 kHz by