Ground States of Attractive Fermi Schr\"odinger Systems with Ring-Shaped Potentials

Abstract

As an application of the finite-rank Lieb-Thirring inequality established in [R. L. Frank, D. Gontier and M. Lewin, Comm. Math. Phys., 2021], we study ground states of mass-critical N-coupled Fermi nonlinear Schr\"odinger systems with attractive interactions in R3, which are trapped in ring-shaped potentials. For any given N∈N+, we prove that ground states exist if 0<a<aN*, where a denotes the strength of attractive interactions in the system, and aN* is the best constant of a finite-rank Lieb-Thirring inequality. Moreover, for some N∈N+, we also prove the nonexistence of minimizers for the system as soon as a≥ aN*. Applying the energy estimates and the blow-up analysis, we further analyze the mass concentration behavior of ground states for the system as a aN*.

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