Existence and Asymptotic Behavior of Minimizers for Rotating Bose-Einstein Condensations in Bounded Domains

Abstract

This paper is concerned with the existence and mass concentration behavior of minimizers for rotating Bose-Einstein condensations (BECs) with attractive interactions in a bounded domain D⊂ R2. It is shown that, there exists a finite constant a*, denoting mainly the critical number of bosons in the system, such that the least energy e(a) admits minimizers if and only if 0<a<a*, no matter the trapping potential V(x) rotates at any velocity ≥0. This is quite different from the rotating BECs in the whole plane case, where the existence conclusions depend on the value of (cf. [Theorem 1.1]GLY). Moreover, by establishing the refined estimates of the rotation term and the least energy, we also analyze the mass concentration behavior of minimizers in a harmonic potential as a a*.

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