Some remarks on the inhomogeneous biharmonic NLS equation

Abstract

We consider the inhomogeneous biharmonic nonlinear Schr\"odinger equation i ut +2 u+λ|x|-b|u|α u = 0, where λ= 1 and α, b>0. In the subctritical case, we improve the global well-posedness result obtained in GUZPAS for dimensions N=5,6,7 in the Sobolev space H2(RN). The fundamental tools to establish our results are the standard Strichartz estimates related to the linear problem and the Hardy-Littlewood inequality. Results concerning the energy-critical case, that is, α=8-2bN-4 are also reported. More precisely, we show well-posedness and a stability result with initial data in the critical space H2.