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Bibliographic Details
Main Authors: Lee, Hwi, Liu, Yingjie
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2509.00668
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author Lee, Hwi
Liu, Yingjie
author_facet Lee, Hwi
Liu, Yingjie
contents We present a level-set based finite difference method to calculate the ground states of Bose Einstein condensates in domains with curved boundaries. Our method draws on the variational and level set approaches, benefiting from both of their long-standing success. More specifically, we use the normalized gradient flow, where the spatial discretization is based on the simple Cartesian grid with fictitious values in the outer vicinity of the domains. We develop a PDE-based extension technique that systematically and automatically constructs ghost point values with third-order accuracy near irregular boundaries, effectively circumventing the computational complexity of interpolation in these regions. Another novel aspect of our work is the application of the PDE-based extension technique to a nodal basis function, resulting in an explicit ghost value mapping that can be seamlessly incorporated into implicit time-stepping methods where the extended function values are treated as unknowns at the next time step. We present numerical examples to demonstrate the effectiveness of our method, including its application to domains with corners and to problems involving higher-order interaction terms.
format Preprint
id arxiv_https___arxiv_org_abs_2509_00668
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A level-set based finite difference method for the ground state Bose-Einstein condensates in smooth bounded domains
Lee, Hwi
Liu, Yingjie
Numerical Analysis
We present a level-set based finite difference method to calculate the ground states of Bose Einstein condensates in domains with curved boundaries. Our method draws on the variational and level set approaches, benefiting from both of their long-standing success. More specifically, we use the normalized gradient flow, where the spatial discretization is based on the simple Cartesian grid with fictitious values in the outer vicinity of the domains. We develop a PDE-based extension technique that systematically and automatically constructs ghost point values with third-order accuracy near irregular boundaries, effectively circumventing the computational complexity of interpolation in these regions. Another novel aspect of our work is the application of the PDE-based extension technique to a nodal basis function, resulting in an explicit ghost value mapping that can be seamlessly incorporated into implicit time-stepping methods where the extended function values are treated as unknowns at the next time step. We present numerical examples to demonstrate the effectiveness of our method, including its application to domains with corners and to problems involving higher-order interaction terms.
title A level-set based finite difference method for the ground state Bose-Einstein condensates in smooth bounded domains
topic Numerical Analysis
url https://arxiv.org/abs/2509.00668