Local and global well-posedness for the kinetic derivative NLS on R

Abstract

We investigate the local and global well-posedness of the kinetic derivative nonlinear Schr\"odinger equation (KDNLS) on R, described by \[ i∂t u + ∂x2 u = iα ∂x (|u|2 u) + iβ ∂x (H(|u|2) u), \] where α, β ∈ R, and H represents the Hilbert transformation. For KDNLS, the L2 norm of a solution is decreasing (resp. increasing, conserved) when β is negative (resp. positive, zero). Focusing on the Sobolev spaces H2 and H2 H1,1, we establish local well-posedness via the energy method combined with gauge transformations to address resonant interactions in both cases of negative and positive β. For the dissipative case β < 0, we further demonstrate global well-posedness by deriving an a priori bound in H2.