On the energy-critical quadratic nonlinear Schr\"odinger system with three waves
Abstract
In this article, we consider the dynamics of the energy-critical quadratic nonlinear Schr\"odinger system \[ \ aligned & i u1t + 1 u1 = -u2u3, \\ & i u2t + 2 u2 = -u1u3, \\ & i u3t + 3 u3 = -u1u2, \\ aligned . (t, x) ∈ × 6 \] in energy-space H1 × H1× H1 $, where the sign of potential energy can not be determined. We prove the scattering theory with mass-resonance (or with radial initial data) below ground state via concentration compactness method. We discover a family of new physically conserved quantities with mass-resonance which play an important role in the proof of scattering.
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