On the Limiting Behavior of L2-Critical Pseudo-Relativistic Fermi Systems

Abstract

We consider ground states of a pseudo-relativistic Fermi system in the L2-critical case. We prove that the system admits ground states, if and only if the attractive strength a satisfies 0<a<D4/3,2, where D4/3,2∈(0, ∞) is the optimal constant of a dual fractional Lieb--Thirring inequality. The limiting behavior of ground states for the system is further analyzed as a D4/3,2. As a byproduct, the qualitative properties of optimizers for the dual fractional Lieb-Thirring inequality are also investigated.

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