Konsep Inti
Thermal states of local Hamiltonians are separable above a certain temperature, challenging conventional entanglement beliefs.
Abstrak
The content explores the sudden loss of thermal entanglement in high-temperature Gibbs states, debunking traditional assumptions. It delves into efficient sampling methods for product states and quantum speedups, ruling out super-polynomial advantages at fixed temperatures. The analysis covers technical overviews, background on linear algebra and Hamiltonians, and approximating partition functions. Noteworthy is the structural result showing zero entanglement above a critical temperature.
- Introduction
- Quantum systems aim to understand entanglement behavior.
- Previous studies focus on long-range entanglement bounds.
- Technical Overview
- Gibbs states are shown to be unentangled at high temperatures.
- Efficient preparation methods for Gibbs states are detailed.
- Background
- Linear algebra concepts in Hilbert spaces are discussed.
- Hamiltonians of interacting systems and partition function approximations are explained.
- Low-Degree Polynomial Approximation to a Restricted Gibbs State
- Decomposition of matrix expressions for restricted Gibbs states is outlined.
- Series expansions show quasi-locality and good approximation properties.
Statistik
Specifically, for any β < 1/(cd), where c is a constant...
For any β < 1/(cd3), we can prepare a state ε-close to ρ...
Given 0 < ε < 1, there exists an algorithm that outputs a state ε-close to ρ...