The scattering of Dirac fermions on the sine-Gordon kink is studied both
analytically and numerically. To achieve invariance with respect to a discrete
symmetry, the sine-Gordon model is treated as a nonlinear σ-model with a
circular target space that interacts with fermionic isodublets through the
Yukawa interaction. It is shown that the diagonal and antidiagonal parts of the
fermionic wave function interact independently with the external field of the
sine-Gordon kink. The wave functions of the fermionic scattering states are
expressed in terms of the Heun functions. General expressions for the
transmission and reflection coefficients are derived, and their dependences on
the fermion momentum and mass are studied numerically. The existence condition
is found for two fermionic zero modes, and their analytical expressions are
obtained. It is shown that the zero modes do not lead to fragmentation of the
fermionic charge, but can lead to polarization of the fermionic vacuum. The
scattering of the diagonal and antidiagonal fermionic states is found to be
significantly different; this difference is shown to be due to the different
dependences of the energy levels of these bound states on the fermion mass, and
is in accordance with Levinson's theorem.Comment: 18 pages, 7 figure
