I once learned in school, and as far as I know this is also a common thing in many introductory physics books, that a parallel LC circuit can be "bent open" into a dipole antenna, like this:
I am under the impression that this explanation is somewhat dumbed down and not the whole truth. My question is, how much truth is there to it?
To be more precise:
Can (parts of) the dipole antenna be interpreted as some degenerated case of a cylindrical coil and a parallel plate capacitor? I very naively tried to relate this to the formulas $L = \frac{N^2 \mu A}{l}$ and $C= \frac{\varepsilon A}{d}$. For the inductance I can vaguely imagine that a straight wire might be considered as a cylindrical coil with $A=0$ and $N$ infinite, so if you take the correct limits this might get somewhere, but I'm really unsure if this makes any sense.
A dipole antenna does have some inductance and capacity, however related or not to a cylindrical coil and capacitor. Can one compute the resonant frequency from those, similarly to how one computes $f = \frac{1}{2\pi \sqrt{LC}}$ for the LC circuit? Is there an intuitive way to think about this? For LC circuits I have a quite visual conception of how one first charges the capacitor, then this imbalance of charge creates voltage and thus causes a current from one plate to the other, but this current is in some sense delayed by the inductance and thus over-corrects the imbalance in charges, leading to the capacitor being charged the other way around, and so on. Is there a similar explanation for the oscillation of a dipole? (If this is also dumbed down and not quite correct, please tell me)
An LC circuit has precisely one resonant frequency, while a dipole is also resonant at odd multiples of its base frequency. How does this fit into the picture?
