An Extention of Entanglement Measures for Pure States

TL;DR

This paper extends entanglement measures for pure states by applying a method to construct measures from existing ones, analyzing their properties, and exploring their relationships with other measures like concurrence.

Contribution

It introduces a new approach to extend entanglement measures for pure states, establishing conditions for monotonicity and convexity, and compares these with existing measures such as geometric entanglement and concurrence.

Findings

The extended measures are entanglement monotones and convex.

The measures coincide with geometric entanglement measures for pure states.

The measures are monogamous in 2⊗2⊗d systems.

Abstract

To quantify the entanglement is one of the most important topics in quantum entanglement theory. In [arXiv: 2006.12408], the authors proposed a method to build a measure from the orginal domain to a larger one. Here we apply that method to build an entanglement measure from measures for pure states. First, we present conditions when the entanglement measure is an entanglement monotone and convex, we also present an interpretation of the smoothed one-shot entanglement cost under the method here. At last, we present a difference between the local operation and classical communication (LOCC) and the separability-preserving (SEPP) operations, then we present the entanglement measures built from the geometric entanglement measure for pure states by the convex roof extended method and the method here are equal, at last, we present the relationship between the concurrence and the entanglement measure built from concurrence for pure states by the method here on 2 \otimes 2 systems. We also present the measure is monogamous for 2\otimes 2 \otimes d system.