A framework of linguistic truth-valued propositional logic based on lattice implication algebra

Zou, L; Ma, J; Xu, Y

A framework of linguistic truth-valued propositional logic based on lattice implication algebra

Zou, L Ma, J Xu, Y

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Publisher:: IEEE
Publication Type:: Conference Proceeding
Citation:: IEEE International Conference on Granular Computing, 2006, pp. 574 - 577
Issue Date:: 2006-01

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Field	Value	Language
dc.contributor.author	Zou, L	en_US
dc.contributor.author	Ma, J	en_US
dc.contributor.author	Xu, Y	en_US
dc.contributor.editor	Zhang, YQ	en_US
dc.contributor.editor	Lin, TY	en_US
dc.date	2006-05-10	en_US
dc.date.issued	2006-01	en_US
dc.identifier.citation	IEEE International Conference on Granular Computing, 2006, pp. 574 - 577	en_US
dc.identifier.isbn	1-4244-0134-8	en_US
dc.identifier.uri	http://hdl.handle.net/10453/11914
dc.description.abstract	The linguistic truth values with linguistic hedges is considered. The linguistic hedge operators in the proposition are put forward and the truth values are divided into different grades. Based on lattice implication algebra a framework of linguistic truth-valued propositional logic is presented to deal with both comparable and incomparable of linguistic truth value. The properties of the propositional formula are discussed. Then based on a filter J of L, J-true, J-false of a formula, J-similar literals and J-complementary literals are defined. In the filter, J -resolution method of the linguistic truth value propositional logic is presented.	en_US
dc.publisher	IEEE	en_US
dc.relation.ispartof	IEEE International Conference on Granular Computing	en_US
dc.rights	© 2006 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for all other uses, in any current or future media, including reprinting/republishing this material for advertising or promotional purposes, creating new collective works, for resale or redistribution to servers or lists, or reuse of any copyrighted component of this work in other works.	en_US
dc.title	A framework of linguistic truth-valued propositional logic based on lattice implication algebra	en_US
dc.type	Conference Proceeding
utslib.location	USA	en_US
utslib.location.activity	Atlanta, USA	en_US
utslib.for	0801 Artificial Intelligence and Image Processing	en_US
dc.location.activity	Atlanta, USA	en_US
pubs.embargo.period	Not known	en_US
pubs.organisational-group	/University of Technology Sydney
pubs.organisational-group	/University of Technology Sydney/Faculty of Engineering and Information Technology
utslib.copyright.status	closed_access
pubs.consider-herdc	false	en_US
pubs.place-of-publication	USA	en_US
pubs.start-date	2006-05-10	en_US

Abstract:

The linguistic truth values with linguistic hedges is considered. The linguistic hedge operators in the proposition are put forward and the truth values are divided into different grades. Based on lattice implication algebra a framework of linguistic truth-valued propositional logic is presented to deal with both comparable and incomparable of linguistic truth value. The properties of the propositional formula are discussed. Then based on a filter J of L, J-true, J-false of a formula, J-similar literals and J-complementary literals are defined. In the filter, J -resolution method of the linguistic truth value propositional logic is presented.

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http://hdl.handle.net/10453/11914