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An independence relation for sets of secrets

An independence relation for sets of secrets
An independence relation for sets of secrets

A relation between two secrets, known in the literature as nondeducibility, was originally introduced by Sutherland. We extend it to a relation between sets of secrets that we call independence. This paper proposes a formal logical system for the independence relation, proves the completeness of the system with respect to a semantics of secrets, and shows that all axioms of the system are logically independent.

0302-9743
296-304
More, Sara Miner
979b2749-1732-4a36-abda-64b4f6899ea9
Naumov, Pavel
8b6c40fb-b199-44d5-a8e2-0ebd021566b0
More, Sara Miner
979b2749-1732-4a36-abda-64b4f6899ea9
Naumov, Pavel
8b6c40fb-b199-44d5-a8e2-0ebd021566b0

More, Sara Miner and Naumov, Pavel (2009) An independence relation for sets of secrets. Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), 5514, 296-304. (doi:10.1007/978-3-642-02261-6_24).

Record type: Article

Abstract

A relation between two secrets, known in the literature as nondeducibility, was originally introduced by Sutherland. We extend it to a relation between sets of secrets that we call independence. This paper proposes a formal logical system for the independence relation, proves the completeness of the system with respect to a semantics of secrets, and shows that all axioms of the system are logically independent.

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More information

Published date: 2009
Venue - Dates: 16th International Workshop on Logic, Language, Information and Computation, WoLLIC 2009, , Tokyo, Japan, 2009-06-21 - 2009-06-24
Learn more about Agents, Interactions and Complexity research

Identifiers

Local EPrints ID: 480227
URI: http://eprints.soton.ac.uk/id/eprint/480227
DOI: doi:10.1007/978-3-642-02261-6_24
ISSN: 0302-9743
PURE UUID: 8ff54bef-7215-4de5-ad03-e1655351a456
ORCID for Pavel Naumov: ORCID iD orcid.org/0000-0003-1687-045X

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Date deposited: 01 Aug 2023 17:09
Last modified: 06 Jun 2024 02:12

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Contributors

Author: Sara Miner More
Author: Pavel Naumov ORCID iD

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