On existence and stability results for normalized ground states of mass-subcritical biharmonic NLS on Rd×Tn
Abstract
We study the focusing mass-subcritical biharmonic nonlinear Schr\"odinger equation (BNLS) on the product space Rxd×Tyn. Following the crucial scaling arguments introduced in TTVproduct2014 we establish existence and stability results for the normalized ground states of BNLS. Moreover, in the case where lower order dispersion is absent, we prove the existence of a critical mass number c0∈(0,∞) that sharply determines the y-dependence of the deduced ground states. In the mixed dispersion case, we encounter a major challenge as the BNLS is no longer scale-invariant and the arguments from TTVproduct2014 for determining the sharp y-dependence of the ground states fail. The main novelty of the present paper is to address this difficult and interesting issue: Using a different scaling argument, we show that y-independence of ground states with small mass still holds in the case β>0 and α∈(0,4/(d+n)). Additionally, we also prove that ground states with sufficiently large mass must possess non-trivial y-dependence by appealing to some novel construction of test functions. The latter particularly holds for all parameters lying in the full mass-subcritical regime.
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