Thank you very much :) I am always happy to get some support :)

We should also look what happens for negative times. Remember that we want to have the orbit around the point. So we want to know how it gets in and out again. The choice of the open domain is just convenience. There are many possibilities for writing down this proof.

@@brightsideofmaths thank you !

Yes, v is locally Lipschitz continuous at every point here.

@@brightsideofmaths I'm sorry, but I don´t get it. Let v(x) = x^2, which is locally Lipschitz continuous at every point and set x0 = 0. Now fix any r > 0 and define on (-r, r): f(t) = 3at g(t) = 0 where a is just a constant. Note that both f, g are continuous and bounded real-valued functions on (-r, r) and f(0) = g(0) = x0 = 0. Now we have: (f - g)(t) = 3at [ phi(f) - phi(g) ](t) = integral(0,t) [9a^2*s^2] ds = 3a^2*t^3 so d(f,g) = 3a*r and d(phi(f), phi(g)) = 3a^2*r^3. But if we choose a > 1/r^2 then 3a^2*r^3 > 3a*r. Therefore phi is not a contraction in X, no matter how we choose r. v will be Lipschitz continuous in some neighbourhood of x0 and in the definition of X we must ensure the functions' images are contained in that neighbourhood. Otherwise, we cannot bound the difference in the proof.

I guess you are right that we have to restrict the codomain in the definition of X. What do you recommend for the change?

​@@brightsideofmaths I think you could replace the "bounded condition" by the restriction of the codomain to some neighbourhood where v is bounded and satisfies a Lipschitz condition (e.g. a ball centered at x0). Assuming this is a complete metric space, then choose epsilon small enough so phi maps X into X, and the rest of the video remains the same. Thank you for doing all this work, I really appreciate it!

​@@josetoledo8181 Thank you for pointing out the mistake. I really overlooked that before. I will put an appendix into the pdf version and change the video later. You can check it here: tbsom.de/s/ode12pdf for the moment.