Maximal entanglement — A new measure of entanglement

Author

Beigi, Salman

Author_Institution

Sch. of Math., Inst. for Res. in Fundamental Sci. (IPM), Tehran, Iran

fYear

2014

fDate

7-8 May 2014

Firstpage

1

Lastpage

6

Abstract

Maximal correlation is a measure of correlation for bipartite distributions. This measure has two intriguing features: (1) it is monotone under local stochastic maps; (2) it gives the same number when computed on i.i.d. copies of a pair of random variables. This measure of correlation has recently been generalized for bipartite quantum states, for which the same properties have been proved. In this paper, based on maximal correlation, we define a new measure of entanglement which we call maximal entanglement. We show that this measure of entanglement is faithful (is zero on separable states and positive on entangled states), is monotone under local quantum operations, and gives the same number when computed on tensor powers of a bipartite state.

Keywords

correlation methods; quantum entanglement; quantum statistical mechanics; tensors; bipartite distribution correlation measurement; bipartite quantum states; entanglement measurement; local quantum operations; local stochastic maps; maximal correlation; maximal entanglement; random variable pair; tensor powers; Additives; Correlation; Quantum computing; Quantum entanglement; Tensile stress; Upper bound; Vectors;

fLanguage

English

Publisher

ieee

Conference_Titel

Communication and Information Theory (IWCIT), 2014 Iran Workshop on

Conference_Location

Tehran

Print_ISBN

978-1-4799-4878-9

Type

conf

DOI

10.1109/IWCIT.2014.6842486

Filename

6842486