I will only answer to the last three points. (Warning : I am french and my english isn't great...)
1) When you consider the Fourier transform of a signal multiplied by a specific window, in the spectral domain, you convolute the original spectrum of the signal by the spectrum of your window. In an ideal mathematical world, you would love to have a Dirac since it's convolution would only shift the signal. But to get a Dirac in the frequency you would need a periodic signal in the time domain which isn't defined on a compact (i.e. finite like your sound record) support. And this is too bad because there is a theorem (Paley-Wiener's corollary) that states that if your time-domain support is compact your frequency-domain support is not bounded and the decreasing behaviour of the Fourier transform increase with the regularity of the signal (i.e. window in our case). Great then ! All we have to chose is a nice regular (smooth ?) window. Unfortunately, to get a really smooth window, we have to narrow it (wide smooth windows exist but have other drawbacks dues to their derived function...its like too large constants ahead appealing algorithmic complexity) and it's spectrum will be wider (for the same reason invoked in the theorem). But you (and Obama) believe in compromise to face the (Pontryagin) duality, don't you ? The gaussian is a great compromise since its Fourier transform is a gaussian too (sum of random variables ? convolution ? +,x-morphism in the complex plane...every thing is linked but its a too long non-linear story to be told here). Therefore a lot of window tend to look like a gaussian.
Here is a bunch of windows and spectrums stolen to my speech processing teacher :
2) It's a pure mathematical duality, so it depends of what you mean by fiter. Does applying a Sobel filter into the frequency-domain make any sense ? (in fact it may...)
3) Again, it depends of what you mean by filter.