Long time dynamics for the focusing inhomogeneous fractional Schr\"odinger equation
Abstract
We consider the following fractional NLS with focusing inhomogeneous power-type nonlinearity i∂t u -(-)s u + |x|-b|u|p-1u=0, (t,x)∈ R× RN, where N≥ 2, 1/2<s<1, 0<b<2s and 1+2(2s-b)N<p<1+2(2s-b)N-2s. We prove the ground state threshold of global existence and scattering versus finite time blow-up of energy solutions in the inter-critical regime with spherically symmetric initial data. The scattering is proved by the new approach of Dodson-Murphy (Proc. Am. Math. Soc. 145: 4859--4867, 2017). This method is based on Tao's scattering criteria and Morawetz estimates. One describes the threshold using some non-conserved quantities in the spirit of the recent paper by Dinh (Discr. Cont. Dyn. Syst. 40: 6441--6471, 2020). The radial assumption avoids a loss of regularity in Strichartz estimates. The challenge here is to overcome two main difficulties. The first one is the presence of the non-local fractional Laplacian operator. The second one is the presence of a singular weight in the non-linearity. The greater part of this paper is devoted to prove the scattering of global solutions in Hs(RN).
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