Duality symmetry, zero energy modes and boundary spectrum of the sine-Gordon/massive Thirring model

Abstract

We solve the one-dimensional massive Thirring model, which is equivalent to the one-dimensional sine-Gordon model, with two types of Dirchlet boundary conditions: open boundary conditions (OBC) and twisted open boundary conditions (OBC). The system exhibits a duality symmetry which relates models with opposite bare mass parameters and boundary conditions, i.e: m0 - m0, OBCOBC. For m0<0 and OBC, the system is in a trivial phase whose ground state is unique, as in the case of periodic boundary conditions. In contrast, for m0<0 and OBC, the system is in a topological phase characterized by the existence of zero energy modes (ZEMs) localized at each boundary. As dictated by the duality symmetry, for m0>0 and OBC, the trivial phase occurs, whereas the topological phase occurs for m0>0 and OBC. In addition, we analyze the structure of the boundary excitations, finding significant differences between the attractive (g>0) and the repulsive (g<0) regimes.

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