Asymptotic behavior of discrete Schr\"odinger equations on the hexagonal triangulation
Abstract
In this article, we prove the decay estimate for the discrete Schr\"odinger equation (DS) on the hexagonal triangulation. The l1→ l∞ dispersive decay rate is t-34, which is faster than the decay rate of DS on the 2-dimensional lattice Z2, which is t-23, see [32]. The proof relies on the detailed analysis of singularities of the corresponding phase function and the theory of uniform estimates on oscillatory integrals developed by Karpushkin [15]. Moreover, we prove the Strichartz estimate and give an application to the discrete nonlinear Schr\"odinger equation (DNLS) on the hexagonal triangulation.
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