Solution to x'=x\sin(\frac{\pi}{x}) is unique I want to prove that the

p3sa1bynn

p3sa1bynn

Answered question

2022-04-19

Solution to x=xsin(πx) is unique
I want to prove that the only solution to the ODE
x={xsin(πx) if x00 else

Answer & Explanation

obettyQuokeperg6

obettyQuokeperg6

Beginner2022-04-20Added 14 answers

Step 1
If x(t0)0 for some t00.
We assume t0>0 and x(t0)>0, the other cases is similar. Let x0(0,x(t0)) so that
x0sin(πx0)=0.
Since x(0)=0 and x(t0)>x0, by continuity there is t1(0,t0) so that x(t1)=x0. We also choose the smallest such t1, so that x(t)<x0 for all t<t1. Then the initial value problem
{x=xsin(πx),x(t1)=x0
has two solutions: x(t) and the constant solution y(t)=x0. These two are different since x(t)<x0 for all t<t1. It contradicts the uniqueness theorem, since xsin(πx) is Locally Lipschitz around (t1, x0).

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