The Complex Airy Operator as Explicitly Solvable PT-symmetrical Model
Abstract
We study the Sturm--Liouville operator T()y=-1y''+ p(x)y, with concrete PT-- symmetric potential p(x) = ix and Dirichlet boundary conditions on the segment [-1,1]. Here ∈ (0, ∞) is a physical parameter. We explicitly describe a beautiful phenomenon of the eigenvalue behavior when changes from 0 to ∞. All the critical values of which determine the eigenvalue dynamics, are found in terms of the special Airy functions.
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