Revision 4afbda71-3bee-419a-beee-5ddc80e147a8

Hello. Let $ X^{s,b} $ be the Bourgain space generated by $ \tau - \xi^3 $. It is proved that, for $ s\in (-\frac{1}{2}, 0] $

$$
\| (u^2)_x\|_{X^{s,b'-1}} \leq c \| u \|_{X^{s,b}} \| u\|_{X^{-\frac{1}{2},b}}
$$

for some $ b, b' \in (\frac{1}{2},1) $. I want to know wether it holds that

$$
\|(uv)_x\|_{X^{s,b'-1}} \leq c\|u\|_{X^{s,b}} \|u\|_{X^{-\epsilon,b}}
$$

for some $ \epsilon>0 $. Some references include similar results are welcome.