Dispersive estimates for matrix Schr\"odinger operators in dimension two
Abstract
We consider the non-selfadjoint operator [ = [arraycc - + μ-V1 & -V2 V2 & - μ + V1 array]] where μ>0 and V1,V2 are real-valued decaying potentials. Such operators arise when linearizing a focusing NLS equation around a standing wave. Under natural spectral assumptions we obtain L1(2)× L1(2) L∞(2)× L∞(2) dispersive decay estimates for the evolution eitPac. We also obtain the following weighted estimate \|w-1 eitPacf\|L∞(2)× L∞(2) 1|t|2(|t|) \|w f\|L1(2)× L1(2),\,\,\,\,\,\,\,\, |t| >2, with w(x)=2(2+|x|).
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