Global Solutions for 5D Quadratic Fourth-Order Schr\"odinger Equations
Abstract
We prove small data scattering for the fourth-order Schr\"odinger equation with quadratic nonlinearity equation* i∂t u+2 u+α u2 + β u2=0 R5 equation* for α, β ∈ R. We extend the space-time resonance method, originally introduced by Germain, Masmoudi, and Shatah, to the setting involving the bilaplacian. We show that under a smallness condition on the initial data measured in a suitable norm, the solution satisfies \|u\|L∞x t-54 and scatters to the solution to the free equation. Although our work builds upon an established method, the fourth-order nature of the equation presents substantial challenges, requiring different techniques to overcome them.
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