Question

Let f : R2 → R be a uniformly continuous function and assume that If(y,t)| M. Let yo E R. The goal of this exercise is to show the existence of a function φ : [0, 1] → R that solves the initial value problem o'(t)-F(d(t),t), ф(0)-Yo (a) Show that there is a function n1,R that satisfies t <0 n(リーレ0+.GF(du(s-1/n),s)ds, t20. Hint: Define фп first on [-1,0] , then define фп。n [0,1 /n), then on [1/n, 2/n], and so on inductively b) Show that n is MLipschitz, that is, on(t)-n(t)s Mt- cUsing the Arzéla-Ascoli Theorem (or more precisely Corollary 3.7 of the note "Compacntess in Metric Spaces" on CCLE), show that there is a subse quence (o,")keN that converges uniformly on [0, ll to a continuous function o. (d) Show that ф(t)-yo + F(o(s), s) ds for t 0 and conclude that o is a solution to the intial value problem given above.

Answer 1

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