Low regularity local well-posedness for the zero energy Novikov-Veselov equation

Abstract

The initial value problem u(x,y,0)=u0(x,y) for the Novikov-Veselov equation ∂tu+(∂ 3 + ∂3)u +3(∂ (u∂-1∂ u)+∂(u∂-1∂u))=0 is investigated by the Fourier restriction norm method. Local well-posedness is shown in the nonperiodic case for u0 ∈ Hs(R2) with s > - 34 and in the periodic case for data u0 ∈ Hs0(T2) with mean zero, where s > - 15. Both results rely on the structure of the nonlinearity, which becomes visible with a symmetrization argument. Additionally, for the periodic problem a bilinear Strichartz-type estimate is derived.