Wikipedia:Reference desk/Archives/Mathematics/2008 September 7

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September 7

solenoidal and irrotational field

Is it possible for a vector field to be simultaneously solenoidal and irrotational, that is, divergence and curl free. I don't think it us, but I can't think of a good reason why. This seems to be the essence of the Helmholtz Theorem, but I don't quite see how I could prove that. Thanks very much for any help you can provide! Nathan12343 (talk) 00:39, 7 September 2008 (UTC)

Well, there's the zero field, and for that matter all constant vector fields. Algebraist 00:49, 7 September 2008 (UTC)

See Cauchy-Riemann equations. siℓℓy rabbit (talk) 00:59, 7 September 2008 (UTC)

Calculus of variations spring problem

Hi, I am trying to learn to use calculus of variations to solve a simple hypothetical problem I made up for fun; but I am getting stuck and I don't understand why.

So I have a spring. One end of the spring is moved around so that it is at position ${\displaystyle g(t)}$ at time ${\displaystyle t}$. The other end of the spring I can control its position ${\displaystyle f(t)}$ at time ${\displaystyle t}$. The goal is to find a ${\displaystyle f(t)}$ so that I get the maximum work I can get out of my end. I hope that this problem makes sense. It seems that at worst, ${\displaystyle f(t)=0}$ should give a solution of zero work; and it seems to me that you should be able to do better than that. Perhaps my intuition is wrong here.

So I start with the definition of work:

${\displaystyle {\frac {dW}{dt}}=F(t)\cdot f'(t)}$

And then apply Hooke's law, where ${\displaystyle k}$ is the spring constant:

${\displaystyle {\frac {dW}{dt}}=-k(f(t)-g(t))\cdot f'(t)}$

${\displaystyle {\frac {dW}{dt}}=k(g(t)-f(t))f'(t)}$

The total work is then

${\displaystyle W=\int _{t_{1}}^{t_{2}}{\frac {dW}{dt}}\,dt}$

This is in the same form as needed for the Euler–Lagrange equation:

${\displaystyle W[f]=\int _{t_{1}}^{t_{2}}L[t,f,f']\,dt}$

where

${\displaystyle L[t,f,f']=k(g(t)-f)f'}$

So now I plug this into the Euler–Lagrange equation:

${\displaystyle -{\frac {d}{dt}}{\frac {\partial L}{\partial f'}}+{\frac {\partial L}{\partial f}}=0}$

${\displaystyle -{\frac {d}{dt}}\left[k(g(t)-f)\right]-kf'=0}$

${\displaystyle -k(g'(t)-f')-kf'=0}$

The ${\displaystyle f'}$ now cancel and I am left with:

${\displaystyle -kg'(t)=0}$

Now this equation is simply a condition on my given ${\displaystyle g(t)}$ function! And the function I am trying to optimize (${\displaystyle f(t)}$) completely vanished! How is this possible? Did I do something wrong? Is there some assumption I am violating? I hope this problem makes sense. If not this way then is there another way I can use to solve this problem? Thanks, --71.141.132.142 (talk) 01:27, 7 September 2008 (UTC)

Here are two points. First, regarding your physical model, the distance in Hooke's is distance from equilibrium position, not from the other end: in 1D this is simply a difference of a constant, and so the mathematics works out the same, but if you are working in more than 1D then there is more than one equilibrium, and you have a bit of mess. Second, regarding your mathematics, offhand I can't find any mistakes. Assuming that you have correctly applied the Euler-Lagrange equation, the conclusion you reach is not necessarily impossible: it would simply indicate that if both ${\displaystyle k\neq 0}$ and there exists t for which ${\displaystyle g'(t)\neq 0}$ (i.e., g is non-constant), then there does not exist any such extremal f. Unfortuantely I do not understand the mathematics well enough to be more helpful. Eric. 213.158.252.98 (talk) 13:18, 7 September 2008 (UTC)

Indeed, I can create an example where arbitrarily high work can be extracted. Let t1 = 0, t2 = 1, g(t) = t, and k = 1. Here g represents the equilibrium position. We subject f to the constraint that the spring starts and stops at equilibrium, i.e., f(0) = 0 and f(1) = 1.

Consider the following f. First, just after t = 0, very quickly bring f to the point -A, where A is a constant. Leave your end of the spring at that position until just before t=1, when you very quickly restore f to equilibrium at 1. The work gained is approximately equal to Ak times one unit of distance. Since A is a arbitrary, we can get both arbitrarily high and arbitrarily low amounts of work: thus in this situation we have no global extrema.

A similar construction can be used to make arbitrarily high or low amounts of work in any situation provided that k is nonzero and g is nonconstant. Eric. 213.158.252.98 (talk) 13:38, 7 September 2008 (UTC)

Oh I see. So I can force the other end to put in arbitrarily large amounts of work if they move at all; because if the other end went up, I could just hold the spring arbitrarily low to get him to put in work. It is only when ${\displaystyle g'(t)=0}$ that the other end doesn't put in work at all; and then it doesn't matter what I do. --71.141.132.142 (talk) 21:06, 7 September 2008 (UTC)

Precisely. You could put in realistic constraints on f (disallowing going too far from equilibrium) to force a maximum to exist, but in that case I doubt that the Euler-Lagrange equation will help you find this maximum. Alternatively, you could use a force equation other than Hooke's Law (keep in mind that Hooke's Law is an approximation best for near equilibrium) to close this loophole, and then proceed again with the Euler-Lagrange equation. I bet you can find something interesting with the latter (athough I don't know if it'd be physically realistic -- go find a physicist and tell us what (s)he says!). Eric. 84.215.155.88 (talk) 20:31, 8 September 2008 (UTC)

Help

How do you get from the left hand side to the right: ${\displaystyle {\frac {x^{3}}{1+x^{2}}}=x-{\frac {x}{1+x^{2}}}}$ --RMFan1 (talk) 20:51, 7 September 2008 (UTC)

Use polynomial division (or whatever) to get ${\displaystyle x^{3}=x(1+x^{2})-x}$. Then just cancel a ${\displaystyle 1+x^{2}}$ and you're there. Algebraist 20:56, 7 September 2008 (UTC)

Multiply both sides by ${\displaystyle {(1+x^{2})}}$ .Cuddlyable3 (talk) 23:41, 8 September 2008 (UTC)

That proves equality, but is no use if you have the left hand side and are trying to get to something like the right. Algebraist 23:43, 8 September 2008 (UTC)

Is one supposed to know what expression one is trying to get to before one gets there?Cuddlyable3 (talk) 09:08, 9 September 2008 (UTC)

No. That was in fact my point. I interpreted the OP's question as asking how one was supposed to have got the RHS if one had the LHS, and I outlined the usual method (polynomial division with remainder). Algebraist 11:10, 9 September 2008 (UTC)