The linearized minimal surfaces problem
Abstract
We characterize the kernel of the linearization R of the minimal surface problem about the Euclidean metric in a bounded smooth domain Ω⊂Rn, n2, with the background minimal surfaces being the Euclidean planes. We show that, in the whole-space Euclidean decomposition, the kernel consists of potential fields and TT fields. For bounded domains, a similar phenomenon appears with additional boundary coupling conditions; in particular, the TT part may be coupled to a harmonic conformal component.
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