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Analyzing Stub Matching with Reflection Coefficients
On Apr 13, 9:37 am, Walter Maxwell wrote:
In the thread 'Constructive Interference and Radiowave Propagation', Owen, on 4-8-07 asserted that my writings in Reflections concerning the analysis of stub matching procedures using reflection coefficients are applicable only in cases where the transmission line is either lossless, or distortionless. I disagree, and in what follows I hope to persuade those who agree with Owen's position to reconsider. To assist in understanding why my use of reflection coefficients in analyzing impedance-matching circuitry, I find it useful to include the concept of virtual open- and short-circuit conditions. I realize that some of the posters on this NB deny the existence of virtual open-and short-circuits. Therefore, I hope that my presentation here will also persuade those posters to reconsider their position. While working in an antenna lab for more than 50 years I have analyzed, constructed, and measured hundreds of impedance-matching circuits comprising transmission-line circuitry using reflection coefficients as parameters. For example, in 1958 my assignment was to develop the antenna system for the World's first weather satellite, TIROS 1. The system required an antenna that would radiate efficiently on four different frequencies in two bands that were more than an octave related. It required a coupling circuit that would allow four transmitters to operate simultaneously on all four frequencies without mutual interference. After developing the antenna that also required radiating circular polarization, I then developed the coupling system, which, pardon my English, utilized several virtual open- and short-circuit conditions to accomplish the required isolation between the individual transmitters. The entire coupling system was fabricated in printed-circuit stripline transmission line (not microstrip), with no connectors except for transmitter input ports and output ports feeding the antenna. Remember, this was in 1958. Initially I had only a slotted line for impedance measurements during the development stage, but soon after the PRD-219 Reflectometer became available, invented by my bench mate, Woody Woodward. The PRD-219 measured SWR and the angle of the voltage reflection coefficient. The magnitude rho of the reflection coefficient was obtained from the SWR measurement using the equation rho = (SWR - 1)/(SWR + 1), thus the PRD actually measured the complete complex reflection coefficient. Consequently, all measurements from then on were in terms of reflection coefficient. Keep in mind that I was working with real transmission lines--not lossless lines. There were several stub-matching circuits, several occurrences of virtual open- and short-circuits, and the total loss through the coupler at both the 108 and 235 MHz bands was no greater than 0.2 dB. The input SWR at all four input ports for a run of 12 manufactured units never exceeded 1.05:1 relative to 50 ohms. Please let me now explain my understanding of virtual open- and short-circuits. These circuits are developed by interference between two sets of voltage and current waves having reflection coefficients of equal magnitude and phase differences of 180°, respectively. Consider these two examples of a virtual short circuit: 1: The input impedance of a lossless half-wave (180°) transmission line terminated in a physical short circuit is zero ohms, a short circuit, but a VIRTUAL short circuit because it was achieved only by the interference between the source voltage wave incident on the input (0°) and the reflected voltage wave (180°) returning to the input after 360° of two-way travel on the line and the 180° phase reversal at the physical short terminating the line. The reflected current wave on return to the input encountered no phase change during its travel, thus the current reflection coefficient is in phase with that of the source current, allowing the short circuit to occur. 2: The input impedance of a lossless quarter-wave (90°) transmission line terminated in a physical open circuit is zero ohms, a short circuit, but a VIRTUAL short circuit because it was achieved only by the interference between the voltage wave incident on the input (0°) and the reflected voltage wave (180°) returning to the input after 180° of two-way travel on the line and the 0° phase reversal at the physical open circuit terminating the line. The current reflection coefficient occurs in the same manner as with the half-wave line above. These two examples can be confirmed by referring to any reputable text concerning transmission line theory. The voltage reflection coefficient at the input of these two transmission lines is 1.0 at 180°, and the current reflection coefficient at this point is 1.0 at 0°. These are the reflection coefficients that would be found when measuring at any short circuit, no matter whether it is physical or virtual. Consequently, both physical and virtual short or open circuits placed on a transmission line can cause reflections. Proof is in measurements performed at various points in the antenna coupler developed for the TIROS spacecraft in 1958. Now let's examine a specific example of impedance matching with a stub using reflection coefficients, with more details than I used in the previously-mentioned thread. As I said earlier, I have measured hundreds of stub-matching circuitry, but for this discussion, yesterday I set up an experimental stub-matching circuit for the purpose of being able to report directly on the results of current measurements taken on the circuit. The source is an HP-8640A signal generator, an HP-5328A counter to determine the operating frequency, and the combination of an HP-8405 Vector Voltmeter and an HP-778D dual directional coupler to form a precision RF network analyzer. Because using a 3:1 mismatch the resulting numbers are convenient, I paralleled three precision 50-ohm resistors to form a resistance of 16.667 ohms, resulting in a 3:1 mismatch on the line to be stubbed. On a line with a 3:1 mismatch the correct positioning of a parallel matching stub is 30° toward the source from a position of minimum SWR, where the normalized admittance y = 1.0 + 1.1547. Thus, I selected a short piece of RG-53 coax that measured exactly 30° in length at 16.0 MHz, meaning the stub will be placed 30° rearward of the load. All measurements obtained during the experiment were less than 2 percent in error compared to a perfect text-book setup. Consequently, rather than bore you with the exact measured values, I'm going to use the text-book values for easier understanding. At the 16.667 + j0 load the measured voltage reflection coefficient = 0..5 at 180°, current 0.5 at 0°. At the stub point voltage reflection coefficient of the line impedance = 0.5 at +120°, current 0.5 at -60°. Open-circuited stub 49° in length measured separately in parallel with 50 ohms yields voltage reflection coefficient 0.5 at -120°, current 0.5 at +60°. (Keep in mind that in operation the stub is in parallel with the 50-ohm line resistance at the stub point.) With stub connected in parallel with the line the voltage reflection coefficient at the stub point is 0.04 at 0°, current 0.04 at 180°. (Equivalent SWR = 1.083, and impedance = 54.16 + j0 ohms.) Summarizing reflection coefficient values at stub point with stub in place: Line coefficients: voltage 0.5 at +120°, current -60° Stub coefficients: voltage 0.5 at -120°, current +60° Resultant coefficients: voltage 0.5 at 180°, current 0.5 at 0° These two resultant reflection coefficients resulting from the interference between the load-reflected wave at the stub point and the reflected wave produced by the stub define a virtual short circuit established at the stub point. Let's now consider what occurs when a wave encounters a short circuit. We know that the voltage wave encounters a phase change of 180°, while the current wave encounters zero change in phase. Note that the resultant voltage is at 180°, so the voltage phase changes to 0° on reflection at the short circuit, and is now in phase with the source voltage wave. In addition, the resultant current is already at 0°, and because the current phase does not change on reflection at the short circuit, it remains at 0° and in phase with source current wave. Consequently, the reflected waves add in phase with the source waves, thus increasing the forward power in the line section between the stub and the load. So how do we know that the virtual short circuit resulting from the interference is really performing as a short circuit? First, an insignificant portion of the reflected wave appears on the source side of the stub point, thus, from a practical viewpoint, indicating total re-reflection of the reflected waves at the stub point. Second, the voltage in the line section between the stub and load that has a 3:1 SWR has increased relative to that on the source line by the factor 1.1547, the amount expected on a line having a 3:1 SWR after total re-reflection at an open or short circuit. This increase factor is determined from the equation for the increase in forward power on a line with a specific value of SWR, where rho is the corresponding value of reflection coefficient. The power increase factor equation is power increase = 1/(1 - rho^2). Thus the voltage increase factor is the square root of the power increase factor. With rho = 0.5, as in the case of the above experiment, the power increase factor is 1.3333..., the square root of which is 1.1547. We have thus proved that the virtual short circuit established at the stub point is actually performing as a real short circuit. I believe it is remarkable that the maximum deviation of the measured values obtained during the experiment is less than 2 percent of the text-book values that would appear with lossless elements, and ignoring measurement errors and tolerances of the measuring equipment. The recognized sources of error a 1. Tolerance in readings... read more » Grrr...thought I had posted a followup but it seems to have not shown up. I'll try to capture the essence of it here... I think the idea of a virtual short and a virtual open is fine. I use similar things all the time in my work with op amps, with AGC controlled levels, and even with ratiometric measurements. However, in all these cases, including the transmission line virtual short and open, it's important to understand that it IS only an approximation to the real thing. There are times when the approximation is fine, as in Walt's posted example. However, there are times when the approximation fails, and it's important to somehow be aware of those times. One way to do that is to simply use the tools that are available on modern computers to keep track of line loss, and then the times when the approximation isn't good become obvious. For example... I want to receive signals on 4.00MHz, but there's a very strong station on 4.30MHz. Knowing a little about transmission lines and stubs, I think, "I can build a resonator from a half wave of line shorted at both ends, and tune it to 4MHz. Then I can tap my 50 ohm through line from the antenna to the receiver onto that resonator, and it won't affect the 4.00MHz signal since it looks like an open circuit. If I position the tap point so that at 4.300MHz it's half a wave away from the short at the end of the line, it will see a 4.300MHz virtual short there, and it will eliminate the strong signal that's giving me trouble." So I figure out that the line, using solid polyethylene dielectric line, needs to be about 81 feet long, and the tap point will be 75.53 feet from one end, 5.67 feet from the other. 81 feet of line could get pretty big, so I'll use RG-174 line. I build the resonator--you can look at it as two shorted stubs--and try it out. It doesn't seem to work very well, and I measure it and discover to my horror that the attenuation at 4.3MHz is only about 12dB, and the attenuation at 4.00MHz is over 8dB. I've gained less than 4dB net on my problem. Realizing now that the problem is that the stubs I assumed were lossless really do have some loss, I try larger coax. Well, I've smartened up a bit by now and I first do some calculations and find that with RG-58 (about 0.6dB/100ft at 4MHz), I can get 18.6dB loss at 4.300MHz and only 4.8dB loss at 4.000MHz. That's better, but still not wonderful by any stretch of the imagination. With RG-8, at only about .19dB/100 feet loss at 4MHz, it improves to 28dB loss at 4.300MHz and only about 1.9dB at 4.00MHz. That wouldn't be bad, except that it's an awfully big pile of coax on the floor. At that point I go off and design a good LC filter to do the job, and find I can get less than a dB loss at 4.00MHz and fully 45dB loss at 4.300MHz, with modest size coils (smaller even than the coil of RG174, and much smaller than the RG8), and I can use a trimmer cap to fine- tune the notch to get the most benefit. (BTW--you can also use trimmer caps to tune stubs...which can save lots of cutting.) You can develop a feel for when approximations like the virtual short and the virtual open actually work, but I think you need to go through several scenarios that show the good, but also the bad and the ugly, before you jump into blindly using an approximation. Given how easy it is for me to just include the loss of line in calculations, I'm unlikely to drop that in favor of the approximation. It's practically as easy for me to put loss into my calculations as it is to leave it off, and putting it in makes it immediately obvious when the approximations fail. Cheers, Tom |
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