Unique Information and Secret Key Decompositions

01/23/2019

∙

The unique information (UI) is an information measure that quantifies a deviation from the Blackwell order. We have recently shown that this quantity is an upper bound on the one-way secret key rate. In this paper, we prove a triangle inequality for the UI, which implies that the UI is never greater than one of the best known upper bounds on the two-way secret key rate. We conjecture that the UI lower bounds the two-way rate and discuss implications of the conjecture.

READ FULL TEXT

Unique Information and Secret Key Decompositions

Upper Bounds via Lamination on the Constrained Secrecy Capacity of Hypergraphical Sources

Unique Informations and Deficiencies

Secret key agreement for hypergraphical sources with limited total discussion

Upper bounds on the Rate of Uniformly-Random Codes for the Deletion Channel

Randomness Requirements for Three-Secret Sharing

Secret key distillation over realistic satellite-to-satellite free-space channel: exclusion zone analysis

Secret key distillation over satellite-to-satellite free-space optics channel with a limited-sized aperture eavesdropper in the same plane of the legitimate receiver

Unique Information and Secret Key Decompositions

Related Research

Upper Bounds via Lamination on the Constrained Secrecy Capacity of Hypergraphical Sources

Unique Informations and Deficiencies

Secret key agreement for hypergraphical sources with limited total discussion

Upper bounds on the Rate of Uniformly-Random Codes for the Deletion Channel

Randomness Requirements for Three-Secret Sharing

Secret key distillation over realistic satellite-to-satellite free-space channel: exclusion zone analysis

Secret key distillation over satellite-to-satellite free-space optics channel with a limited-sized aperture eavesdropper in the same plane of the legitimate receiver