A hybrid high-order method for the Gross–Pitaevskii eigenvalue problem
Abstract:
We introduce a hybrid high-order method for approximating the ground state of the nonlinear Gross–Pitaevskii eigenvalue problem. Optimal convergence rates are proved for the ground state approximation, as well as
for the associated eigenvalue and energy approximations. Unlike classical conforming methods, which inherently provide upper bounds on the ground state energy, the proposed approach gives rise to guaranteed and asymptotically exact lower energy bounds. Importantly, and in contrast to previous works, they are obtained directly without the need of post-processing, leading to more accurate guaranteed lower energy bounds in practice.
for the associated eigenvalue and energy approximations. Unlike classical conforming methods, which inherently provide upper bounds on the ground state energy, the proposed approach gives rise to guaranteed and asymptotically exact lower energy bounds. Importantly, and in contrast to previous works, they are obtained directly without the need of post-processing, leading to more accurate guaranteed lower energy bounds in practice.
| Zugehörige Institution(en) am KIT | Institut für Angewandte und Numerische Mathematik (IANM) Sonderforschungsbereich 1173 (SFB 1173) |
| Publikationstyp | Forschungsbericht/Preprint |
| Publikationsmonat/-jahr | 06.2025 |
| Sprache | Englisch |
| Identifikator | ISSN: 2365-662X KITopen-ID: 1000182615 |
| Verlag | Karlsruher Institut für Technologie (KIT) |
| Umfang | 24 S. |
| Serie | CRC 1173 Preprint ; 2025/30 |
| Projektinformation | SFB 1173, 258734477 (DFG, DFG KOORD, SFB 1173/3) |
| Externe Relationen | Siehe auch Forschungsdaten/Software |
| Schlagwörter | Gross–Pitaevskii eigenvalue problem, hybrid high order method, guaranteed lower energy bounds, a priori error analysis |
| Nachgewiesen in | OpenAlex |