Majorana zero modes are the edge modes?

Abstract: Topological phases are typically characterised by a topological invariant: winding number, which indicates the number of zero modes expected in a given phase. However, the winding number alone does not capture the qualitative differences between the modes within the same topological phase. In this work, we present an analytical solution for the zero-energy modes across various regimes of the phase diagram; a result that, to our knowledge, has not been reported previously in the literature. Through this solution, we characterise edge modes coexisting in a single phase and systematically classify them based on their spatial behaviour. Our analysis also identifies parameter regions where one or both zero modes are perfectly localised at the system edges. Finite and infinite systems were compared based on their spatial characteristics of zero modes. In addition, we provide a detailed analytical treatment of the characteristic equation, demonstrating that its roots offer further insight into the nature of the topological phase transitions. The whole study is based on a one-dimensional quantum Ising chain with long range interactions.