Even and odd normalized zero modes in random interacting Majorana models respecting the Parity P and the Time-Reversal-Symmetry T

Abstract

For random interacting Majorana models where the only symmetries are the Parity P and the Time-Reversal-Symmetry T, various approaches are compared to construct exact even and odd normalized zero modes in finite size, i.e. hermitian operators that commute with the Hamiltonian, that square to the Identity, and that commute (even) or anticommute (odd) with the Parity P. Even Normalized Zero-Modes even are well known under the name of 'pseudo-spins' τzn in the field of Many-Body-Localization or more precisely 'Local Integrals of Motion' (LIOMs) in the Many-Body-Localized-Phase where the pseudo-spins happens to be spatially localized. Odd Normalized Zero-Modes odd are popular under the name of 'Majorana Zero Modes' or 'Strong Zero Modes'. Explicit examples for small systems are described in detail. Applications to real-space renormalization procedures based on blocks containing an odd number of Majorana fermions are also discussed.