Quantum entanglement of anyon composites

TL;DR

This paper explores quantum entanglement in a one-dimensional anyon model with a generalized algebra, revealing unique entanglement properties of fermionic composites of anyons.

Contribution

It introduces a novel algebraic framework where fermions are composites of anyons and analyzes their entanglement properties within a Hubbard-like model.

Findings

Fermions in the model are composites of anyons.

Entanglement properties of these composites are characterized.

The model reveals unique entanglement features of anyon-based systems.

Abstract

Studying quantum entanglement in systems of indistinguishable particles, in particular anyons, poses subtle challenges. Here, we investigate a model of one-dimensional anyons defined by a generalized algebra. This algebra has the special property that fermions in this model are composites of anyons. A Hubbad-like Hamiltonian is considered that allows hopping between nearest neighbour sites not just for the fundamental anyons, but for the fermionic anyon composites. Some interesting results regarding the quantum entanglement of these particles are obtained.