tlb wrote:
I do not think it is helpful to say "it spreads as if it were a perpendicular slice of a cone whose axis is collinear with the gun barrel" and then try to talk about "the focal point of that cone". Isn't the focal point of a cone its origin? What you are saying with the spreading part of your remark is that the beam width increases linearly with distance (the same as TFLYTSNBN) and that is not what the formulas that I have found suggest. The Wikipedia page on a Gaussian beam states that the beam width does at some point become linear with range; but only after the Rayleigh range is exceeded. Now if you would put your lecturing robes back: is that true or not for a laser beam in space? Do you agree with JohnRoth that the formula on the website is for a point source, even though it includes an initial beam width and the article is titled "Attenuation of a laser in space"?
PS. After rereading UH, I find that I have been incorrect in my criticism of Beowulf in that they did assign blocking walls to the orbitals (which did not turn on their wedges once the missiles were seen to be attacking the assembly lines) and those blocking ships did prevent debris damage to the planet after the internal explosions.
Since you asked for it, the lecture robes are going back on <shrugging>...
First off, I'm not going to comment on the Wikipedia article since I have not read it (recently), nor did I reference it.
Now on to my imagery - yes I can see how the gun barrel & cone visualization can be problematic; that said, let's go back to it and pay particular attention to the aperture of the barrel.
An ideal Gaussian beam is parallel
within the lasing barrel. The 'spreading' occurs when the beam leaves the barrel. The exit aperture is in essence a slit/hole in a grate/cover. The nature of a wave is such that whenever any wave passes through a slit it spreads out. The underlying Uncertainty Principle is at work here. [just a quick refresher: Uncertainty Principle - if you restrict position, momentum gets fuzzed or if you restrict momentum, position gets fuzzed; the Observer Effect is derived from the Uncertainty Principle, if you observe a particle's position with absolute certainty, you now know absolutely nothing about its momentum (e.g. its speed and direction); with regards to wave functions: momentum is related to propagation velocity and its frequency (and in some cases amplitude), while position is related to wave length and displacement] When the wave (front) is passing through the aperture on its exit, it is at an interface between two separate media and it is being localized/constricted across the aperture. Since the energy load (e.g. the momentum) of the wave is fixed upon exiting then the only thing that can be 'uncertain' is the direction & velocity of the wave. Therefore, upon entering a medium that has more freedom than what existed before, if the waves in the wave front were parallel before, their direction can now be something other than parallel. The wave front
spreads, and the spreading is in the same plane as the aperture.
Why is the spreading conical? That's assuming there are no other forces interacting with the wave front. The spreading is within a maximum angle from the initial traveling direction of the wave front. Assuming the ideal parallel wave front - then, just paying attention to the edges of the aperture, you will have rays (vector lines) delimiting the maximum possible spread as the wave front propagates onward. To simplify calculations, we assume the spreading is even up to the theoretical edge. From the aperture onward what is described is a (truncated) prismatoid, now the formulas for those can be a bit much - so we adapt and overcome by backtracking the rays until they converge into a single point, and lo & behold we are now dealing with a cone (and conic sections) and we have a pretty good tool box to deal with those things.
So, for lasing, even though the internal pumping may ideally achieve parallel throughput - the practical effect will be a spreading discharge that can be related to a conic section.
This may look like a lot of 'handwavium' but it is real science. Wave theory, while being applicable in our everyday experiences, is NOT exactly transparent in the details; it is one step before and a necessary prerequisite to the really spooky stuff - quantum theories.
My advice, don't get hung up on the math - it can be understood without it. Now if you have a project where you need to build something reliant on detailed knowledge of the behavior of waves, then its off to the Calculus mines for you sir!
-David S.
