Matryoshka approach to Sine-Cosine topological models

TL;DR

This paper introduces a hierarchical class of Sine-Cosine topological models, called SSC(n), which exhibit recursive squaring properties, chiral symmetry, and protected edge states, with potential extensions to higher dimensions.

Contribution

It defines the novel class of SSC(n) models with recursive squaring properties and analyzes their band structure, symmetry, and edge states, expanding understanding of topological chain models.

Findings

SSC(n) models are uniquely determined by energy renormalizations and shifts.

Edge states at zero energy in lower-order models become finite energy states in higher-order models.

Chiral symmetry protects edge states across the Sine-Cosine chain hierarchy.

Abstract

We address a particular set of extended Su-Schrieffer-Heeger models with $2n$ sites in the unit cell [SSH($2n$)], that we designate by Sine-Cosine models [SC$(n)$], with hopping terms defined as a sequence of $n$ sine-cosine pairs of the form $\{\sin(\theta_j),\cos(\theta_j)\}$, $j=1, \cdots,n$. These models, when squared, generate a block-diagonal matrix representation with one of the blocks corresponding to a chain with uniform local potentials. We further focus our study on the subset of SC$(2^{n-1})$ chains that, when squared an arbitrary number of times (up to $n$), always generate a block which is again a Sine-Cosine model, if an energy shift is applied and if the energy unit is renormalized. We show that these $n$-times squarable models [SSC$(n)$] and their band structure are uniquely determined by the sequence of energy unit renormalizations and by the energy shifts associated to each step of the squaring process. Chiral symmetry is present in all Sine-Cosine chains and edge states levels at the respective central gaps are protected by it. Zero-energy edge states in a SSC$(j)$ chain (with $j<n$) of the Matryoshka sequence obtained squaring the SSC$(n)$ chain with open boundary conditions (OBC), become finite energy edge states in non-central band gaps of the SSC$(n)$ chain. The extension to higher dimensions is discussed.