On Jensen-type inequalities for nonsmooth radial scattering solutions of a loglog energy-supercritical Schrodinger equation
Abstract
Given n ∈ \ 3,4 \ (resp. n=5) and k > 1 (resp. 43 > k > 1), we prove scattering of the radial Hk:= Hk(Rn) H1(Rn) solutions of the loglog energy-supercritical Schrodinger equation i ∂t u + u = |u|4n-2u logγ (( 10 + |u|2 )) for 0 < γ < γn. In order to control the barely supercritical nonlinearity for nonsmooth solutions, i.e solutions with data in Hk, k ≤ n2, we prove some Jensen-type inequalities.
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