Physics – Mathematical Physics
Scientific paper
2011-01-20
Journal of Mathematical Physics 53 (2012) 012104
Physics
Mathematical Physics
V1: 28 pages. V2: 21 pages. Presentation significantly streamlined and shortened. This version accepted for publication in the
Scientific paper
10.1063/1.3676070
Scattering from a compound barrier, one composed of a number of distinct non-overlapping sub-barriers, has a number of interesting and subtle mathematical features. If one is scattering classical particles, where the wave aspects of the particle can be ignored, the transmission probability of the compound barrier is simply given by the product of the transmission probabilities of the individual sub-barriers. In contrast if one is scattering waves (whether we are dealing with either purely classical waves or quantum Schrodinger wavefunctions) each sub-barrier contributes phase information (as well as a transmission probability), and these phases can lead to either constructive or destructive interference, with the transmission probability oscillating between nontrivial upper and lower bounds. In this article we shall study these upper and lower bounds in some detail, and also derive bounds on the closely related process of quantum excitation (particle production) via parametric resonance.
Boonserm Petarpa
Visser Matt
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