T(f) has an unique fixed point. Namely, the trivial one where f(x) is identically zero. Let f be any fixed point of T(f). Since f is continuous on [0,1], it is bounded there. Define M as ...

Some times it's easier than you think. The fixed point is the zero function. The big hint is that A is linear, which makes 0 a fixed point regardless of contractivity.

You mean you are unable to compute \int_{2-1/n}^2n(t^2-1)\mathrm dt=\left.n\left(\frac{t^3}3-t\right)\right|_{2-1/n}^2=3-\frac2n+\frac1{3n^2}, how so?

The optimization variable is x. We have \begin{align} F^*(\zeta)=&\sup_x\left(\underbrace{\int_0^1\frac{1}{4}\zeta^2\,dt}_{\text{does not depend on ...

Let g(t)=t^4 and G -antiderivative of g G'(t)=g(t). Then by Fundamental Theorem of Calculus: f(x)=\int_{0}^{x^2} g(t) dt=G(x^2)-G(0) Derive both sides (right side using chain rule): f'(x)=(G(x^2)-G(0))=(x^2)'G'(x^2)=2xg(x^2)=2x \cdot (x^{2})^4=2x^{9}

Since f'(x)=(f(x))^2, the function f is non decreasing; since f(0)=0, we have f(x)\ge0 for x>0. If I=\{x>0:f(x)>0\} is not empty, then it is an open interval of the form (a,\infty). ...