Spectral asymptotics for two-dimensional Dirac operators in thin waveguides
Abstract
We consider the two-dimensional Dirac operator with infinite mass boundary conditions posed in a tubular neighborhood of a C4-planar curve. Under generic assumptions on its curvature , we prove that in the thin-width regime the splitting of the eigenvalues is driven by the one dimensional Schr\"odinger operator on L2( R) \[ Le := -d2ds2 - 2π2 \] with a geometrically induced potential. The eigenvalues are shown to be at distance of order from the essential spectrum, where 2 is the width of the waveguide. This is in contrast with the non-relativistic counterpart of this model, for which they are known to be at a finite distance.
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