Dynamics of the combined nonlinear Schr\"odinger equation with inverse-square potential

Abstract

We consider the long-time dynamics of focusing energy-critical Schr\"odinger equation perturbed by the H12-critical nonlinearity and with inverse-square potential(CNLSa) in dimensions d∈\3,4,5\ equationNLS-ab cases i∂tu-Lau=-|u|4d-2u+|u|4d-1u, (t,x)∈R×Rd,CNLSa,\\ u(0,x)=u0(x)∈ H1a(Rd), cases equation where La=-+a|x|-2 and the energy is below and equal to the threshold ma, which is given by the ground state Wa satisfying LaWa=|Wa|4d-2Wa. When the energy is below the threshold, we utilize the concentration-compactness argument as well as the variatonal analysis to characterize the scattering and blow-up region. When the energy is equal to the threshold, we use the modulation analysis associated to the equation NLS-ab to classify the dynamics of Ha1-solution. In both regimes of scattering results, we do not need the radial assumption in d=4,5. Our result generalizes the scattering results of [31-33] and [3] in the setting of standard combined NLS.