Non-unique connection between bulk topological invariants and surface physics

TL;DR

This paper explores the complex relationship between bulk topological invariants and surface states in topological insulators, revealing new phases and phase transitions that challenge traditional bulk-boundary correspondence assumptions.

Contribution

It analytically demonstrates the non-uniqueness of the connection between 3D topological invariants and surface physics, identifying new phases and critical parameters affecting topological classifications.

Findings

Perpendicular Dirac velocity controls surface state behavior.

Boundaries between behavior types are topological phase transitions.

Existence of surface states without band inversion at finite thickness.

Abstract

At the heart of the study of topological insulators lies a fundamental dichotomy: topological invariants are defined in infinite systems, but surface states as their main footprint only exist in finite systems. In the slab geometry, namely infinite in two planar directions and finite in the perpendicular direction, the 2D topological invariant was shown to display three different types of behaviour. The perpendicular Dirac velocity turns out to be a critical control parameter discerning between different qualitative situations. When it is zero, the three types of behaviour extrapolate to the three 3D topologically distinct phases: trivial, weak and strong topological insulators. We show analytically that the boundaries between types of behaviour are topological phase transitions of particular significance since they allow to predict the 3D topological invariants from finite-thickness transitions. When the perpendicular Dirac velocity is not zero, we identify a new phase with surface states but no band inversion at any finite thickness, disentangling these two concepts which are closely linked in 3D. We also show that at zero perpendicular Dirac velocity the system is gapless in the 3D bulk and therefore not a topological insulating state, even though the slab geometry extrapolates to the 3D topological phases. Finally, in a parameter regime with strong dispersion perpendicular to the surface of the slab, we encounter the unusual case that the slab physics displays non-trivial phases with surface states but nevertheless extrapolates to a 3D trivial state.