2012
DOI: 10.3934/dcds.2012.32.703
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On the Cauchy problem for nonlinear Schrödinger equations with rotation

Abstract: We consider the Cauchy problem for (energy-subcritical) nonlinear Schrödinger equations with sub-quadratic external potentials and an additional angular momentum rotation term. This equation is a well-known model for superfluid quantum gases in rotating traps. We prove global existence (in the energy space) for defocusing nonlinearities without any restriction on the rotation frequency, generalizing earlier results given in [11,12]. Moreover, we find that the rotation term has a considerable influence in provi… Show more

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Cited by 45 publications
(99 citation statements)
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“…The aim of this paper is to propose a simple and efficient numerical method to solve the GPE in a rotating frame, which may include a dipolar interaction term. One novel idea of the proposed method consists in the use of rotating Lagrangian coordinates as in [6], in which the angular momentum rotation term vanishes. Hence, we can easily apply the methods for nonrotating BECs in [8,12,15] to solve the rotating case.…”
mentioning
confidence: 99%
“…The aim of this paper is to propose a simple and efficient numerical method to solve the GPE in a rotating frame, which may include a dipolar interaction term. One novel idea of the proposed method consists in the use of rotating Lagrangian coordinates as in [6], in which the angular momentum rotation term vanishes. Hence, we can easily apply the methods for nonrotating BECs in [8,12,15] to solve the rotating case.…”
mentioning
confidence: 99%
“…was considered in [13], where the authors proved global existence for defocusing nonlinearities (λ > 0) without restricting the rotation frequency, generalizing earlier results given in [14] and [15], and find some blowup solutions in the focusing case λ < 0. Followed by the same idea, we consider the problem (1.2) with coupled Hartree-type nonlinearities which must compete with the local nonlinearities to ensure the existence of global or blowup solutions of system (1.2).…”
Section: Introductionmentioning
confidence: 80%
“…Followed by the same idea, we consider the problem (1.2) with coupled Hartree-type nonlinearities which must compete with the local nonlinearities to ensure the existence of global or blowup solutions of system (1.2). The analyzing of the interaction between the local and nonlocal nonlinearities did not occur in [13].…”
Section: Introductionmentioning
confidence: 94%
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