D.E. Pelinovsky and S. Sobieszek
Morse index for the ground state in the energy super-critical Gross-Pitaevskii equation
Journal of Differential Equations 341 (2022) 380-401
Abstract:
The ground state of the energy super-critical Gross-Pitaevskii equation with a
harmonic potential converges in the energy space to the singular solution in the limit of large
amplitudes. The ground state can be represented by a solution curve which has either oscillatory
or monotone behavior, depending on the dimension of the system and the power of the focusing
nonlinearity. We address here the monotone case for the cubic nonlinearity in the spatial
dimensions d >= 13. By using the shooting method for the radial Schrodinger operators, we
prove that the Morse index of the ground state is finite and is independent of the (large)
amplitude. It is equal to the Morse index of the limiting singular solution, which can be
computed from numerical approximations. The numerical results suggest that the Morse index
of the ground state is one and that it is stable in the time evolution of the cubic Gross-Pitaevskii
equation in dimensions d >= 13.
Keywords:
Gross-Pitaevskii equation, energy super-critical case, oscillatory behavior, mononote behavior,
shooting method, Morse index, rigorous asymptotics.