If $m(\xi)$ satisfies $$D^{\alpha}m(\xi)\leq \frac{C}{(1+|\xi|)^{|\alpha|+1}}$$ then is $m$ a Fourier transform of a $L^{1}$ function? (Note that the Bernstein theorem can't be applied here, since $m(\xi)$ may not be in $H^{s}$, where $s>\frac{n}{2}$.)
Generally, are there some simple ways to make sure that a given function belongs to $\mathcal{F}L^{1}$?