摘要
We investigate the coupling of the minimal surface equation with a spinor of harmonic type. This arises as the Euler–Lagrange equations of the sum of the volume functional and the Dirac action, defined on an appropriated Dirac bundle. The solutions show a relation to Dirac-harmonic maps under some constraints on the energy-momentum tensor, extending the relation between Riemannian minimal surface and harmonic maps.
源语言 | 英语 |
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页(从-至) | 513-526 |
页数 | 14 |
期刊 | Vietnam Journal of Mathematics |
卷 | 49 |
期 | 2 |
DOI | |
出版状态 | 已出版 - 6月 2021 |
已对外发布 | 是 |