You can continue by using Holder's inequality: \int_x^y |f(t) dt| \leq \left( \int_x^y |f(t)|^3 dt \right)^\frac{1}{3} \left( \int_x^y 1^\frac{3}{2} \right)^\frac{2}{3} as 3 and 3/2 are ...

For (1), note that F is continuous and moreover F'(x)=f(x)>0 so F is also strictly monotone. Hence F is injective and by the Intermediate Value Theorem F attains all the values between F(0)=0 ...

A(\alpha x) < \alpha A(x) does not tell you that A is concave upward. What you have to show is: A(\alpha x +(1-\alpha) y) \leq \alpha A(x) +(1-\alpha) A(y) for x<y and 0 < \alpha <1. To ...

There isn't necessarily a unique solution, however consider the following: We know via basic calculus that if F is a function such that F' = f, then \int_0^x f(t)dt = F(x) - F(0) so we can use ...

(I'm self-answering as no other answer was quite as lightweight as what Joey's answer inspired me.) Let F(x)=\int_0^xf(t)dt, and g(x)=f(x)F(x). We have g(x)\sim1 and therefore we can write: \int_0^xg(t)dt\sim1 \iff \frac{1}{2}F^2(x)\sim x ...

Let's consider a simple case: \int_0^x x\; dx. Applying the usual method, \int_0^x x\; dx = \dfrac{x^2}{2}\big|_0^x =\text{?} The lower term is \dfrac{x^2}{2} evaluated at x=0, and this is ...