I am struggling a lot in finding the reference (book or, even better, academic paper) that states that:
$u(t)$ $t^{α} ↔^{FT} f^{-(α+1)}$
as I found here An Interesting Fourier Transform - 1/f Noise in the formula in the first box of the link.
I searched a lot, but I did not find any reference, and they are very important to me.
You will find a "proof" of principle in math-stackexchange: Fourier transform of power function $t^\alpha$ (the title lacks the mention of the unit step function $u(t)$). At least formally, the Fourier transform of one-sided power law turns into a Laplace transform, and looks a lot like the Gamma function (the one related to the factorial).
You can find a similar description on page 276 of the chapter Appendix A. Mathematical Background, Power law.
What I find troubling in this "simple proof" is that the convergence and well-behaved properties of the power-law functions are not satisfied. They are not integrable in the traditional sense, so it should be treated with tempered distributions or generalized functions, and Schwartz functions decaying faster than powers.
You will find a clean demonstration in Terence Tao blog: 245C, Notes 3: Distributions. 3. Tempered distributions, around Equation 9. In dimension $d$ ($d=1$ for you), the formula reads:
$$\widehat{u(t)t^\alpha}(f) = \frac{\pi^{-(d-\alpha)/2}\Gamma((d-\alpha)/2)}{\pi^{-\alpha/2}\Gamma(\alpha/2)}|f|^{-(d-\alpha)}$$
[Nota: this is a follow-up of question: Can I simplify $x=\frac{\ln(|fft((ifft(\sqrt{(f^{-5/3})}))^{2})|)}{\ln(f)}$]
I haven't found a reference but it appears to be related to the derivative/integral properties of the FT: $n^{th}$ derivative in frequency corresponds to multiplication with $t^n$ in the time domain (divded by $i^n$) . If you start with FT of the unit step function $U(\omega) = \mathscr{F} \{u(t)\}$ then we can simply write
$$\mathscr{F} \{u(t)\cdot t^n\} = i^n\frac{d^n}{d\omega^n}\cdot U(\omega)$$
For n < 0 you can use either use integration or differentiation in time.
