Indeed, it gets thin as it approaches the y-axis, but that's not enough. It need to get thin fast enough. To illustrate, let's look at another function in another limit y=\frac{1}{x^2} as x \longrightarrow \infty ...

Yes, that is correct. You could also use that \int f^2 - f =0 by assumption, but (because f^2 is a characteristic function so that f is of modulus one) f^2 - f = |f|-f\geq 0, which yields |f| = f ...

That's not what “using partitions” mean. It means to use the definition of the Riemann integral. So, let P_n=\left\{0,\frac1n,\frac2n,\ldots,1\right\} . The upper sum with respect to this partition ...

Well it is not a contradiction, actually the real value is 1, because in your case you can apply \int f(x) dg = \int f(x)\cdot g'(x) dx. This gives exactly \int_{0}^1 x d(2x) = \int_{0}^1 x\cdot 2 dx = 2\int_{0}^1 x dx =1 ...

I think you're talking about using the Riemann sum to calculate integrals. For example, \int_0^1x^2dx=\lim_{n\rightarrow\infty}\sum_{i=1}^n\left(\frac{i}{n}\right)^2\frac{1}{n}=\lim_{n\rightarrow\infty}\frac{1}{n^3}\sum_{i=1}^ni^2=\lim_{n\rightarrow\infty}\frac{n(n+1)(2n+1)}{6n^3}=\frac{1}{3}. ...

In this case you could apply integration by parts in thi way \int_0^xF(z)\cdot 1\,dz=[F(z)\cdot z]_0^x-\int_0^xF'(z)\cdot z\,dz