"A conceptual relation between Circle Limit IV, an artistic creation by M.C. Escher, and Smith Chart, geographical aid for microwave engineering created by P.H. Smith, was established. The basis of Escher's art and Smith chart can both be traced back to invariance of the cross ration of four complex numbers under Möbius transformation on the domain of complex numbers. The Smith chart can be used as an aid for constructing Escher-like drawings that display periodic mosaic patterns and at the same time convey the perception of infinite progression within a unit circle."
I've used Smith charts many times on my NanoVNA analysing antennas, but despite being mathematically inclined I never thought of the complex plane mapping involved
f(z) = (z − 1)/(z + 1)
The Smith chart is useful to electronic engineers because a given VSWR (the thing you try to minimise to get a good antenna) becomes a circle about the center of the Smith chart
VSWR= (1 + | Γ |)/(1 - | Γ |)
So to make your antenna better, get the plot closer to the center. Whether it is above the line or below tells you whether the antenna is inductive or capacitive and hence which kind of loading to add.
I loved smith charts during my microwave classes in college. I've always felt like there should be a fun game based on the mechanics of using a smith chart.
> The Smith chart from electrical engineering is the image of a Cartesian grid under the function f(z) = (z − 1)/(z + 1). More specifically, it’s the image of a grid in the right half-plane.
Well, I'm already confused. The domain is complex numbers where the real part is >= 0? I think it would be helpful to make that clear from the get-go. When I see "Cartesian grid", I think R^2, not C.
So you can continue it beyond that circle if you like, it just happens to be the case that the thing electrical engineers and others dealing with waveguides are plotting in the source space, is impedance. (Well, a ratio of impedances—a load impedance divided by a transmission line impedance.) The real part of impedance is resistance, and negative resistance is very uncommon. The area outside the unit circle so mapped, I think also corresponds to reflected amplitude ≤ transmitted amplitude, with the center of the diagram being a perfectly matched impedance, and no reflection.
I made an interactive implementation here: https://observablehq.com/@mbostock/smith-chart
that's beautiful!
"Escher's art, Smith Chart and Hyperbolic Geometry"
https://www.researchgate.net/publication/3427377_Escher's_ar...
"A conceptual relation between Circle Limit IV, an artistic creation by M.C. Escher, and Smith Chart, geographical aid for microwave engineering created by P.H. Smith, was established. The basis of Escher's art and Smith chart can both be traced back to invariance of the cross ration of four complex numbers under Möbius transformation on the domain of complex numbers. The Smith chart can be used as an aid for constructing Escher-like drawings that display periodic mosaic patterns and at the same time convey the perception of infinite progression within a unit circle."
This is one of my favorite explanations of how to use a Smith chart in practice: https://www.cypress.com/file/136236/download
Also this one: https://www.ti.com/lit/an/swra046a/swra046a.pdf
I've used Smith charts many times on my NanoVNA analysing antennas, but despite being mathematically inclined I never thought of the complex plane mapping involved
f(z) = (z − 1)/(z + 1)
The Smith chart is useful to electronic engineers because a given VSWR (the thing you try to minimise to get a good antenna) becomes a circle about the center of the Smith chart
VSWR= (1 + | Γ |)/(1 - | Γ |)
So to make your antenna better, get the plot closer to the center. Whether it is above the line or below tells you whether the antenna is inductive or capacitive and hence which kind of loading to add.
> f(z) = (z − 1)/(z + 1)
Also known as the Bilinear Transform https://en.wikipedia.org/wiki/Bilinear_transform
Used for mapping between s-plane and z-plane when discretising using the trapezoidal rule.
I loved smith charts during my microwave classes in college. I've always felt like there should be a fun game based on the mechanics of using a smith chart.
This software is so good it is as enjoyable as any game, it taught me to love Smith Charts
https://www.ae6ty.com/smith_charts/
I’m just amazed there isn’t a nearly impenetrable Greg Egan book based on them.
Btw, as all Möbius transforms, a Smith chart can be understood by looking at the complex plane as a sphere:
https://www.youtube.com/watch?v=0z1fIsUNhO4
This animation is helpful:
https://en.wikipedia.org/wiki/Smith_chart#/media/File:Animat...
> The Smith chart from electrical engineering is the image of a Cartesian grid under the function f(z) = (z − 1)/(z + 1). More specifically, it’s the image of a grid in the right half-plane.
Well, I'm already confused. The domain is complex numbers where the real part is >= 0? I think it would be helpful to make that clear from the get-go. When I see "Cartesian grid", I think R^2, not C.
So you can continue it beyond that circle if you like, it just happens to be the case that the thing electrical engineers and others dealing with waveguides are plotting in the source space, is impedance. (Well, a ratio of impedances—a load impedance divided by a transmission line impedance.) The real part of impedance is resistance, and negative resistance is very uncommon. The area outside the unit circle so mapped, I think also corresponds to reflected amplitude ≤ transmitted amplitude, with the center of the diagram being a perfectly matched impedance, and no reflection.
I have PTSD from learning Smith charts in school.
My prof even said to me "If you'd pay attention, you'd understand this!". I was the only one who was brave enough to ask questions about it!
Heh, this reminds me, don't worry:
One of my extremely intelligent roommates in the 80s switched from EE to CS, seemingly due to Smith charts and Electromagnetics coursework.
He went on to make a large fortune in software.
Sounds like it was the right decision then.
Terrifying. My nightmares will return.
Why would you use one?
Is this related to Cardioid patterns for directional microphones?
No. Sorry, that is not a helpful comparison.
These are wormhole graphs, right?