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This work studies the focusing inhomogeneous nonlinear equation of Hartree type i ₓ u-K_u +|x|^-|u|^p-2 (J_ *||^-|u|^p) u=0, u (t, x): R^3. Here, the linear Schrödinger operator reads K_: = -+|x|^{2} for some >-14. The Riesz potential is J_ (x) =C_|x|^- (3-) for certain 00 gives an inhomogeneous non-linearity. One considers the inter-critical regime, namely, 1+2 (1-) +30 because there is no dispersive estimate L^1 L^ for 0, there is a ground state which minimizes the associated Gagliardo–Nirenberg-type estimate. The purpose is to investigate the energy scattering of global solutions under the ground state threshold. One uses the method of Dodson–Murphy based on Tao’s scattering criteria and Morawetz estimates. The decay of the inhomogeneous term |x|^- avoids any spherically symmetric assumption.
Saanouni et al. (Tue,) studied this question.
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