Stability Estimates for Commutativity Properties of the Dirichlet-to-Neumann Operator
Abstract
The Laplacian Sn-1 on the unit sphere Sn-1⊂ Rn has the property that it can explicitly be expressed in terms of , the Dirichlet-to-Neumann map of the unit ball, as Sn-1=2+(n-2). In this paper, we seek to characterize those manifolds for which such an exact relationship holds, and more generally measure the discrepancy of such a relationship holding in terms of geometric data. To this end, we obtain a stability estimate which shows that, for a smoothly bounded domain in R3, if the commutator [,Sn-1] is small then that domain is itself close to a ball. We then study the case of manifolds conformal to the ball, show that a relationship as above implies a radial metric structure, and discuss stability in this setting. Finally, we provide a modern exposition of Gohberg's lemma, a foundational result in microlocal analysis which we employ as a starting step for our reasoning.
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