(De-)Exciting the Third Poschl-Teller Kink
Abstract
There is a series of scalar models possessing reflectionless kinks whose linear perturbations are described by a P\"oschl-Teller potential at integer level σ. The cases σ=1 and 2 are the well-known Sine-Gordon and φ4 double-well models. The σ=3 kink has received relatively little attention because it exhibits a φ8/3 potential, whose third derivative diverges in the vacuum. In old-fashioned perturbation theory this yields a cubic interaction that diverges far from a kink. We nonetheless use this interaction to calculate the amplitudes and probabilities for incoming radiation to excite or de-excite one of the kink's two shape modes. As each shape mode is localized about the kink, the leading order amplitudes are nonetheless finite. This suggests that the σ=3 model is not pathological, but rather its mesons are quantum field theoretic extensions of Znojil's bound states.
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