Convergence analysis of Sobolev Gradient flows for the rotating Gross-Pitaevskii energy functional
Abstract
This paper studies the numerical approximation of the ground state of rotating Bose--Einstein condensates, formulated as the minimization of the Gross--Pitaevskii energy functional under a mass conservation constraint. To solve this problem, we consider three Sobolev gradient flow schemes: the H01 scheme, the a0 scheme, and the au scheme. Convergence of these schemes in the non-rotating case was established by Chen et al., and the rotating au scheme was analyzed in Henning et al. In this work, we prove the global convergence of the H01 and a0 schemes in the rotating case, and establish local linear convergence for all three schemes near the ground state. Numerical experiments confirm our theoretical findings.
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