Blow up of the critical norm for some radial L2 super critical nonlinear Schrodinger equations

Abstract

We consider the nonlinear Schr\"odinger equation iut=- u-|u|p-1u in dimension N≥ 3 in the L2 super critical range 1+4N<p<N+2N-2. The corresponding scaling invariant space is Hsc with 0<sc<1 and this covers the physically relevant case N=p=3. The existence of finite time blow up solutions is known. Let u(t)∈ Hsc H1 be a radially symmetric blow up solution which blows up at 0<T<+∞, we prove that the scaling invariant Lpc norm where Hsc Lpc also blows up with a lower bound |u(t)|Lpc≥ |(T-t)|CN,p as t T.

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