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I have a question about NDSolve function in Mathematica. I have an oscillator defined by these two equations:

x' = v
v' = -x - u*v^3

where u is some constant.

How to create an NDSolve that resolves this? I tried following code (it has to depend on time) but it doesnt work:

eq1 = x'[t] == v;
eq2 = v' == -x[t] - u*v^3;
eq3 = x[0] == 2;

(initial displacement is 2m).

s = NDSolve[{eq1, eq2, eq3}, x, {t, 0, 30}]

Thank you very much...

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If you have further questions, most of the experts here have now moved over to Mathematica. –  rcollyer Apr 30 '12 at 1:14
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2 Answers

up vote 1 down vote accepted

You need to observe that the first equation once differentiated with respect to t can be used to substitute for v[t]. But then the second equation becomes a ODE of second order and requires to be supplied with another extra initial condition. We will give

v[0]==x'[0]==some number

Then after solving this ODE for x you can recover v[t]==x'[t] I give you the solution in term of a Manipulate so that geometrically the situation becomes clear to you.

(* First equation *)
v[t] = x'[t];
(* 
   Differentiate this equation once and substitute 
   for v[t] in the second equation
*)
Manipulate[
With[{u = Constant, der = derval}, 
     res = NDSolve[{x''[t] == -x[t] - u*x'[t]^3, x[0.] == 2,x'[0.] == der},
     x, {t, 0., 30.}] // First; 
     Plot[Evaluate[{x[t], v[t]} /. res], {t, 0, 30}, PlotRange -> All,
     Frame -> True,Axes -> None, ImageSize -> 600]
   ],
{{Constant, 0.,TraditionalForm@(u)}, 0.,3, .1},
{{derval, -3., TraditionalForm@(v[0] == x'[0])}, -3, 3, .1}
]

enter image description here

Hope this helps you but next time before you ask you need to brush up the theory first as you can see the question you asked concerns very basic and elementary Mathematics not Mathematica programming. Good luck!!

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Thanks! I guess I didnt get 100% clear what I had to do... sorry for that. Anyway - great job! –  Smajl Apr 29 '12 at 20:15
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You need to specify a numeric value for your u as well as an initial condition for v[t] :

u=1.0;
solution=NDSolve[{x'[t]==v[t], v'[t]==-x[t]-u v[t]^3,x[0]==2,v[0]==-1},{x,v},{t,0,1}]

Plot[{solution[[1,1,2]][t],solution[[1,2,2]][t]},{t,0,1}]

enter image description here

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