Scattering through a straight two-dimensional quantum waveguide Rx(0,d) with
Dirichlet boundary conditions on (-\infty,0)x{y=0} \cup (0,\infty)x{y=d} and
Neumann boundary condition on (-infty,0)x{y=d} \cup (0,\infty)x{y=0} is
considered using stationary scattering theory. The existence of a matching
conditions solution at x=0 is proved. The use of stationary scattering theory
is justified showing its relation to the wave packets motion. As an
illustration, the matching conditions are also solved numerically and the
transition probabilities are shown.Comment: 26 pages, 3 figure

Birman M. S.

E. Soccorsi

Exner P.

J. Dittrich

Jaffe A.

Ph. Briet

Reed M.

Zuily C.

English

arXiv

International audienceScattering through a straight two-dimensional quantum waveguide R × (0, d) with Dirichlet boundary conditions on (R * − × {y = 0}) ∪ (R * + × {y = d}) and Neumann boundary condition on (R * − × {y = d}) ∪ (R * + × {y = 0}) is considered using sta-tionary scattering theory. The existence of a matching conditions solution at x = 0 is proved. The use of stationary scattering theory is justified showing its relation to the wave packets motion. As an illustration, the matching conditions are also solved numerically and the transition probabilities are shown

Briet, Philippe

Dittrich, J

Soccorsi, E

Archive Ouverte en Sciences de l'Information et de la Communication

Scattering through a straight quantum waveguide with combined boundary conditions

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Journal of Mathematical Physics

https://hal.archives-ouvertes.fr/hal-01093602

Scattering through a straight quantum waveguide with combined boundary
  conditions

Scattering through a straight quantum waveguide with combined boundary conditions

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Archive Ouverte en Sciences de l'Information et de la Communication

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