On the inhomogeneous NLS with inverse-square potential
Abstract
We consider the inhomogeneous nonlinear Schr\"odinger equation with inverse-square potential in RN i ut + La u+λ |x|-b|u|α u = 0,\;\;La= -a|x|2, where λ=1, α,b>0 and a>-(N-2)24. We first establish sufficient conditions for global existence and blow-up in H1a(RN) for λ=1, using a Gagliardo-Nirenberg-type estimate. In the sequel, we study local and global well-posedness in H1a(RN) in the H1-subcritical case, applying the standard Strichartz estimates combined with the fixed point argument. The key to do that is to establish good estimates on the nonlinearity. Making use of these estimates, we also show a scattering criterion and construct a wave operator in H1a(RN), for the mass-supercritical and energy-subcritical case.
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