The Iterated Projected Position Algorithm for Constructing Exponentially Localized Generalized Wannier Functions for Periodic and Non-Periodic Insulators in Two Dimensions and Higher

TL;DR

This paper introduces the Iterated Projected Position (IPP) algorithm for constructing exponentially localized generalized Wannier functions applicable to both periodic and non-periodic insulators, overcoming limitations of gauge optimization methods.

Contribution

The IPP algorithm provides a non-optimization-based, matrix diagonalization approach with guaranteed exponential localization under mild conditions, applicable to complex materials including non-periodic systems.

Findings

Successfully applied to the Haldane model and Kane-Mele model.

Guaranteed exponential localization under mild assumptions.

Effective for non-periodic and quasi-crystal lattice systems.

Abstract

Localized bases play an important role in understanding electronic structure. In periodic insulators, a natural choice of localized basis is given by the Wannier functions which depend a choice of unitary transform known as a gauge transformation. Over the past few decades, there have been many works which have focused on optimizing the choice of gauge so that the corresponding Wannier functions are maximally localized or reflect some symmetry of the underlying system. In this work, we consider fully non-periodic materials where the usual Wannier functions are not well defined and gauge optimization is impossible. To tackle the problem of calculating exponentially localized generalized Wannier functions in both periodic and non-periodic system we discuss the "Iterated Projected Position (IPP)" algorithm. The IPP algorithm is based on matrix diagonalization and therefore unlike optimization based approaches it does not require initialization and cannot get stuck at a local minimum. Furthermore, the IPP algorithm is guaranteed by a rigorous analysis to produce exponentially localized functions under certain mild assumptions. We numerically demonstrate that the IPP algorithm can be used to calculate exponentially localized bases for the Haldane model, the Kane-Mele model (in both $\mathbb{Z}_2$ invariant even and $\mathbb{Z}_2$ invariant odd phases), and the $p_x + i p_y$ model on a quasi-crystal lattice.