On the magnetic Dirichlet to Neumann operator on the exterior of the disk -- diamagnetism, weak-magnetic field limit and flux effects

Abstract

In this paper, we analyze the magnetic Dirichlet-to-Neumann operator (D-to-N map) (b,) on the exterior of the disk with respect to a magnetic potential Ab, =Ab + A where, for b∈ R and ∈ R, Ab (x,y)= b\, (-y, x) and A (x,y) is the Aharonov-Bohm potential centered at the origin of flux 2π . First, we show that the limit of (b,) as b→ 0 is equal to the D-to-N map () on the interior of the disk associated with the potential A (x,y). Secondly, we study the ground state energy of the D-to-N map (b,) and show that the strong diamagnetism property holds. Finally we slightly extend to the exterior case the asymptotic results obtained in the interior case for general domains.

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