Hint for the revised question: for $\frac12<s<1$, $p\geq 1$. For $s=m+\sigma$ ($0<\sigma<1$, $m\geq 1$ as above), $p\geq m+1$.
The "if" part is straightforward using the double integral definition of $H^s$. The "only if" part will better be dealt with using Fourier series $i\ \sum \pm|n|^{-\alpha} e^{int}$ ($\pm :=$ sign of $n$) or $\sum |n|^{-\alpha} (e^{int}-1)$ that vanish at $0$ with a singularity.