Litcius/Paper detail

Area law of noncritical ground states in 1D long-range interacting systems

Tomotaka Kuwahara, Keiji Saito

2020Nature Communications55 citationsDOIOpen Access PDF

Abstract

The area law for entanglement provides one of the most important connections between information theory and quantum many-body physics. It is not only related to the universality of quantum phases, but also to efficient numerical simulations in the ground state. Various numerical observations have led to a strong belief that the area law is true for every non-critical phase in short-range interacting systems. However, the area law for long-range interacting systems is still elusive, as the long-range interaction results in correlation patterns similar to those in critical phases. Here, we show that for generic non-critical one-dimensional ground states with locally bounded Hamiltonians, the area law robustly holds without any corrections, even under long-range interactions. Our result guarantees an efficient description of ground states by the matrix-product state in experimentally relevant long-range systems, which justifies the density-matrix renormalization algorithm.

Topics & Concepts

Quantum entanglementUniversality (dynamical systems)PhysicsGround stateBounded functionLawQuantumRenormalization groupStatistical physicsRenormalizationQuantum phase transitionQuantum stateQuantum discordQuantum phasesCluster stateQuantum mechanicsTheoretical physicsW stateQuantum systemQuantum informationState (computer science)Quantum many-body systemsQuantum Information and CryptographyQuantum and electron transport phenomena