Wikipedia:Reference desk/Archives/Mathematics/2024 March 8

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March 8

Bouncing ball confinement

When a ball is dropped in vacuum in a uniform gravitational field from a height ${\displaystyle h}$ onto an immovable surface whose lowest point is at height ${\displaystyle 0,}$ obeying an idealized version of Newton's laws and bouncing back totally elastically, it can theoretically bounce back to its release height, possibly only after many bounces, but will never get higher than ${\displaystyle h.}$ This is an easy consequence of the preservation of energy, itself a consequence of Newton's laws, combined with the fact that kinetic energy, initially zero, is a nonnegative quantity.

Watching a video illustrating the butterfly effect in a 2D setting, in which 100 balls with imperceptibly different initial positions all very close to ${\displaystyle (x_{0},y_{0})}$ are simultaneously dropped on the curve given by ${\displaystyle y=|x|,}$ it seemed to me that the balls basically remained confined to the rectangle with vertices

${\displaystyle (0,0),\left({\frac {x_{0}{+}y_{0}}{2}},{\frac {y_{0}{+}x_{0}}{2}}\right),(x_{0},y_{0}),\left({\frac {x_{0}{-}y_{0}}{2}},{\frac {y_{0}{-}x_{0}}{2}}\right).}$

This is a much stronger confinement than ${\displaystyle y\leq y_{0}.}$ Is there some simple mathematical argument supporting my observation?  --Lambiam 19:58, 8 March 2024 (UTC)

Don't have an answer, but someone else has a video which documents essentially the same phenomenon, this time tracing a path. The video title says "square" but I'm fairly sure that's just an artifact of the ball being dropped close to the apex. GalacticShoe (talk) 07:07, 9 March 2024 (UTC)

Indeed, one of the replies to the video is just the three words, "not a square". When ${\displaystyle x_{0}=0}$ the trajectory is either undefined or confined to the line ${\displaystyle x=0}$, but the limit case of the hypothesized rectangle for ${\displaystyle x_{0}\to 0}$ is a square. (The best way to define the bounce-back when the trajectory hits ${\displaystyle (0,0)}$ is to have the ball move back in the direction it came from, the limit case of hitting ${\displaystyle (\pm \varepsilon ,\varepsilon ).}$)  --Lambiam 10:06, 9 March 2024 (UTC)

A few thoughts: The second video shows that the boundary is the envelope of all the possible trajectories. The possible trajectories are parabolas ${\displaystyle y=y_{\mathrm {max} }-b(x-x_{0})^{2}}$, with the apex at ${\displaystyle x_{0}}$ (to be shown that this is always so), height given by ${\displaystyle y_{\mathrm {max} }=y_{0}-{\tfrac {1}{2}}{\dot {x}}_{0}^{2}}$, and ${\displaystyle b}$ to be expressed in terms of the transverse velocity at the apex ${\displaystyle {\dot {x}}_{0}}$ as well. This should give the one-parameter family of parabolas, and somebody should be able to determine the envelope. --Wrongfilter (talk) 07:42, 9 March 2024 (UTC)

Thanks. This probably gives enough hints to prove the confinement hypothesis, after which it may not be a trivial exercise to reduce the proof to a much more elementary one based on invariants following from Newton's laws plus elasticity.  --Lambiam 10:06, 9 March 2024 (UTC)

I think the first thing to do is apply the conservation of energy, if the apex of the parabola is at ${\displaystyle y_{1}}$ then we have:

${\displaystyle {\frac {Energy}{m}}=const.=y_{0}g=y_{1}g+{\frac {{\dot {x}}^{2}}{2}}.}$

Assume for now that this occurs at ${\displaystyle x=x_{0}}$; we'll verify this later. Call the value of ${\displaystyle {\dot {x}}}$ for a specific path ${\displaystyle v_{x}}$. Parametric equations for the parabola are given by:

${\displaystyle x=x_{0}+v_{x}t,y=y_{1}-{\frac {gt^{2}}{2}}=y_{0}-{\frac {{v_{x}}^{2}}{2g}}-{\frac {gt^{2}}{2}}.}$

Eliminate t and write ${\displaystyle k={\frac {{v_{x}}^{2}}{g}}}$ to get an implicit form for the equation:

${\displaystyle y-y_{0}+{\frac {k}{2}}+{\frac {(x-x_{0})^{2}}{2k}}=0,}$

where k is a constant determining the path. The next step is to verify that that if two of these curves intersect on the line ${\displaystyle x=y}$, then their angles with the line are the same. That will confirm then when the ball bounces off the line the new curve will be in the same family, which is what we assumed at the beginning. Suppose the two curves

${\displaystyle y-y_{0}+{\frac {k}{2}}+{\frac {(x-x_{0})^{2}}{2k}}=0}$

${\displaystyle y-y_{0}+{\frac {l}{2}}+{\frac {(x-x_{0})^{2}}{2l}}=0}$

intersect at (x, y) with k≠l. Eliminating y:

${\displaystyle kl=(x-x_{0})^{2}.}$

The normal vectors to the two curves are given by

${\displaystyle ({\frac {x-x_{0}}{k}},1),({\frac {x-x_{0}}{l}},1).}$

The reflection of the first vector by the line x=y is

${\displaystyle (1,{\frac {x-x_{0}}{k}})}$

and by the previous equation this is a scalar multiple of the second vector, and this proves that the directions are reflections of each other. The corresponding fact for y=-x should be similar. Note that we did not use x=y anywhere, and I think this implies that you could insert short diagonal line segments into the "field of play" and the result would be the same. The balls may bounce around as in a pinball machine but they would still be constrained to be in the family of parabolic paths. Finally, it remains to find the envelope of the family. This is done by setting the partial derivative with respect to k of the implicit equation to 0 and eliminating k. We get:

${\displaystyle {\frac {\partial }{\partial k}}(2k(y-y_{0})+k^{2}+(x-x_{0})^{2})=0,}$

which gives:

${\displaystyle k=-(y-y_{0}).}$

Plug this back into the original equation to produce:

${\displaystyle (x-x_{0})^{2}=(y-y_{0})^{2},}$

and this gives the two lines ${\displaystyle y-y_{0}=\pm (x-x_{0})}$ in question. As far as the original question is concerned I'm not sure if this counts as "simple" or not. There is a lot of messy algebra going on but conceptually it's not that hard. Consider too that this is from someone specializing in math and having little working knowledge of physics. I'm sure someone who has taken a few more physics courses than I have would have more tricks for tackling this sort of thing mare easily, using additional physical invariants etc. --RDBury (talk) 20:09, 9 March 2024 (UTC)

PS. If you don't like the envelope part there is a simpler approach. If

${\displaystyle 2k(y-y_{0})+k^{2}+(x-x_{0})^{2}=0}$

has a solution in k then the discriminant must be non-negative, in other words

${\displaystyle (y_{0}-y)^{2}\geq (x_{0}-x)^{2}.}$

We know that ${\displaystyle y_{0}-y\geq 0}$ from which we can deduce ${\displaystyle y\leq y_{0}-|x_{0}-x|.}$ --RDBury (talk) 20:35, 9 March 2024 (UTC)

PPS. (Some additional random thoughts.) If you replace k with z in the above equation, the result is the equation of a surface in space. This turns out to be a cone and slicing the cone by fixing z=k gives you conic sections. These turn out to be the parabolic trajectories. When you project the cone to the x-y plane you get the region ${\displaystyle (y_{0}-y)^{2}\geq (x_{0}-x)^{2}.}$ as before.

I think this could be generalized as follows. Start with any curve, say x=x(k), y=y(k) parameterized by k. Assume the apex of each parabola is on this curve, then the equation for each parabola can be worked out using the conservation of energy as above. This gives an equation in x, y and k. If this turns out to be quadratic in k then there is a region where each point is crossed by two of the parabolas. You can work out their tangent lines at that point, find the bisectors, and by assuming that a new curve is tangent to one of the bisectors you get a differential equation for the new curves. There are two bisectors so there are two differential equations, and the two sets of solutions would form orthogonal trajectories. In the case where the starting curve is a vertical line the resulting families of curves turn out to be diagonal lines. It's not hard to see that if the starting curve is a horizontal line then you get vertical and horizontal lines. The upshot in that case is that if you drop a ball in to a rectangular well then it will keep bouncing back to original height. I suppose the next easiest case would be when the starting curve is a diagonal line. The more complex the starting curve the more difficult it will be to work out the envelope of the parabolas and solve the differential equations. In the case where g=0 this is related to reflected caustics

Going back to the original problem, instead of saying that the ball bounces off the wall, say that it goes through but now the gravitational force is reflected through the wall. The result would be a gravitational field of the form f=(0, -g) if y>|x|, (-g, 0) if x>|y|, f=(0, g) if y<-|x|, and (g, 0) if x<-|y|. (Sort of like the taxicab metric but with gravity.) This is not a central field so the conservation of angular momentum would not hold, and indeed it's not hard to see that an "orbit" can change direction sometimes. But there is a well defined potential function, namely g⋅max(|x|, |y|).

Finally, are we sure that we're observing an actual butterfly effect here, or is it an artifact of the simulation? Looking at some of the other bouncing ball simulations on the same channel, with most of them the balls become a chaotic mess limited above only by the original height. With g=0 and the container a square, the path will eventually get arbitrarily close to any point in the interior provided that the starting angle is irrational. But that's not chaotic behavior since small changes in the starting position do not result in increasingly larger changes in future positions. Are we sure that something similar wouldn't happen if the simulation was perfectly accurate? --RDBury (talk) 18:33, 11 March 2024 (UTC)

It is hard to determine visually whether the system is chaotic. It may make a difference that we are dealing with a piecewise linear curve. Does it have a positive Lyapunov exponent? (Rather than ${\displaystyle |\delta \mathbf {Z} (t)|\approx e^{\lambda t}|\delta \mathbf {Z} _{0}|,}$ I think the criterion should be ${\displaystyle |\delta \mathbf {Z} (t)|=O(e^{\lambda t}|\delta \mathbf {Z} _{0}|)}$ for some ${\displaystyle \lambda >0}$; "the" Lyapunov exponent should then be the supremum of the range satisfying the condition.) But with a bounded phase space the supremum is necessarily zero, so we need a modified definition, perhaps something related to the notion of entropy.

Not obviously related, but perhaps there is a connection: a version with more balls shows an intriguing phenomenon at the end of 0:41.  --Lambiam 22:52, 11 March 2024 (UTC)

The fact that you can still make out the moose at the end of video makes me suspicious. There is another video comparing walls y=2|x| and y=.5|x|. Those are piecewise linear but the case for those systems being truly chaotic is a lot more believable for me. I suspect that the two lines being at right angles is the critical factor, but I'm not going to write my own simulator just to find out. Note that the rectangular well I mentioned above does not produce chaotic motion. --RDBury (talk) 06:16, 12 March 2024 (UTC)