I have been looking into fractional Sobolev spaces and I see that there are two standard definitions: the one defined via Fourier Transform, and the other via a seminorm. My question is about the later.
Definition: Let $\Omega$ be an open subset of $\mathbb{R}^N$, $s = m + \sigma$ with $ 0 < \sigma < 1$, $m$ and integer, and $1 \leq p < \infty$. We say that $u \in W^{s, p}(\Omega)$ if $u \in W^{m, p}$ and $$\int_{\Omega} \int_{\Omega} \frac{\vert \partial^{\alpha}u(x) - \partial^{\alpha}u(y)\vert^{p}}{\vert \vert x - y \vert \vert ^{N+\sigma p}} < + \infty \: \forall \, \vert \alpha \vert= m$$
My question is, why does it make sense to define it in this way? What is the importance of the spacial dimension $N$?