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We prove dispersive estimates for solutions to the Schrödinger equation with a real-valued potential V∈L^∞(Rⁿ), n≥4, satisfying V(x)=O(〈x〉^{−(n+2)/2−ε}), ε>0.

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We prove dispersive estimates for solutions to the Schrödinger equation with a real-valued potential V∈L^∞(Rⁿ), n≥4, satisfying V(x)=O(〈x〉^{−(n+2)/2−ε}), ε>0.

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Dispersive estimates of solutions to the Schrödinger equation in dimensions n≥4

Abstract

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