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We identify several asymptotic regimes according to the relative strength of the outer field. When the outer field is fixed, the lowest eigenvalue exhibits persistent oscillations and the low-energy states localize in the outer region. When the outer field grows more slowly, the behavior depends strongly on the geometry: it is eventually monotone for non-circular domains, while oscillations may persist for disks. In the critical regime, where the two fields are comparable, geometry and flux distribution both play a decisive role. When the outer field dominates, the problem reduces asymptotically to an effective operator on the inner region.
These results show how uneven magnetic scaling, topology, and geometry shape the high-flux spectral behavior.
From: Ayman Kachmar [view email]
[v1]
Fri, 29 May 2026 03:31:56 UTC (37 KB)
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