Trilinear Airy estimates

Algebraic identity

Much of the trilinear estimate theory for Airy equation rests on (various permutations of) the following "four-wave resonance identity":

• The key algebraic fact is (various permutations of)

${\displaystyle \xi _{1}^{3}+\xi _{2}^{3}+\xi _{3}^{3}+\xi _{4}^{3}=3(\xi _{1}+\xi _{4})(\xi _{2}+\xi _{4})(\xi _{3}+\xi _{4})}$ whenever ${\displaystyle \xi _{1}+\xi _{2}+\xi _{3}+\xi _{4}=0}$

Estimates

The following trilinear estimates are known:

• The 1/4 estimate references.html#Ta-p2 Ta-p2 on R:

The 1/4 is sharp references.html#KnPoVe1996 KnPoVe1996.We also have

see [Cv-p].

• The 1/2 estimate references.html#CoKeStTaTk-p3 CoKeStTkTa-p3 on T: if u,v,w have mean zero, then

The 1/2 is sharp references.html#KnPoVe1996 KnPoVe1996.

• Remark: the trilinear estimate always needs one more derivative of regularity than the bilinear estimate; this is consistent with the heuristics from the Miura transform from mKdV to KdV.