Threshold solutions for the 3d cubic INLS: the energy-subcritical case
Abstract
We revisit the work [L. Campos and J. Murphy, SIAM J. Math. Anal., 55 (2023), pp. 3807--3843], which classified the dynamics of H1 solutions at the ground state threshold for cubic inhomogeneous nonlinear Schr\"odinger equations of the form i∂t u + u + |x|-b|u|2 u = 0 in the range b∈(0,12). By modifying the modulation analysis and using Strichartz estimates in place of pointwise bounds, we extend the result to the full energy-subcritical range b∈(0,1). This strategy is expected to carry over to other dispersive equations with singular potentials.
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