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The nonstationary Schrödinger equation is solved numerically by the Cayley method for wave packets that are formed from surface states on the surface of topological insulators and are scattered by a potential barrier, including a barrier with magnetization. The transmission coefficient and spin density distributions are calculated. Expressions are found for the static transmission coefficient through a barrier with the use of the plane-wave approximation and its generalization for wave packets. It is shown that the two-dimensional nature of wave packets leads to noticeable differences in the behavior of the transmission coefficient compared to that in the plane-wave scattering problem. For instance, two-dimensional packets exhibit a significant suppression of Klein tunneling in some energy regions. The results obtained show that the tunneling and spin density of localized wave-packet-type electronic states in structures based on topological insulators can be affected through potential barriers.
Khomitsky et al. (Wed,) studied this question.