An intrinsic fuzzy set on the universe of discourse of predicate formulas

Wang, Guojun; Qin, Xiaoyan; Zhou, Xiangnan

doi:10.1016/j.fss.2006.08.006

Cited by 5 publications

(6 citation statements)

References 15 publications

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“…But, because of the complexity of interpretations for first-order language, it's quite hard to complete this work in predicate logic, and so far there are only some sporadic results such as refs. [18,[30][31][32][33][34][35][36][37][38][39][40]. Among them, the work in ref.…”

Section: Co-published By Atlantis Press and Taylor And Francismentioning

confidence: 99%

“…Distinct to the former two, ref. [36] first established an axiomatic theory of truth degree of formulae from the point view of syntactic instead of semantics, but it's a pity that only the truth degrees of all the closed formulae in predicate logic was studied. Compared with the former three, the model proposed in ref.…”

Section: Co-published By Atlantis Press and Taylor And Francismentioning

confidence: 99%

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The validity degree vectors of formulae in two-valued predicate logic

Qin¹,

Xu²,

Liu³

2015

IJCIS

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By means of infinite product of uniformly distributed probability spaces of cardinal n, the concept of n-validity degrees and validity degree vectors of formulae in two-valued predicate logic are introduced. It is proved that the validity degree vectors of formulae can preserve the logical relation between formulae. Moreover, a consistency theorem is obtained which says that the n-validity degree τ n (A) of the quantifierfree first-order formula A without any repeated predicate symbols or terms is independent of the natural number n, and is a constant equal to the validity degree τ(A 0 ) of the corresponding proposition A 0 in classical propositional logic.

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Section: Co-published By Atlantis Press and Taylor And Francismentioning

confidence: 99%

Section: Co-published By Atlantis Press and Taylor And Francismentioning

confidence: 99%

The validity degree vectors of formulae in two-valued predicate logic

Qin¹,

Xu²,

Liu³

2015

IJCIS

View full text Add to dashboard Cite

show abstract

“…. , n} and the binary relation R is determined by (32), but the valuation V : Φ → ℘(W ) can change arbitrarily. Let M n,R denote the set of all this kind of models.…”

Section: (N) Truth Degrees Of Formulas In Temporal Logicmentioning

confidence: 99%

“…[32] was only a preliminary test far from satisfactory because it defined truth degrees for predicate formulas simply by taking the average of the values obtained from two extreme cases. The present paper thinks of a basic idea for establishing a reasonable truth degrees theory in predicate logic, that is, to find out an appropriate part of predicate formulas with simple forms, and first define truth degrees for these predicate formulas and then extend the concept to general predicate formulas.…”

mentioning

confidence: 99%

“…As in ref. [32], the present paper considers only finite models. Even so, the calculation in this paper is far more complex than the corresponding calculation in classical propositional logic, because the valuations of a formula in the system K can be any subset of the power set of a finite model, while that of the latter only need to be chosen from the two-element-set of {True, False}.…”

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confidence: 99%

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Theory of (n) truth degrees of formulas in modal logic and a consistency theorem

Wang

Duan

2009

Sci. China Ser. F-Inf. Sci.

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The theory of (n) truth degrees of formulas is proposed in modal logic for the first time. A consistency theorem is obtained which says that the (n) truth degree of a modality-free formula equals the truth degree of the formula in two-valued propositional logic. Variations of (n) truth degrees of formulas w.r.t. n in temporal logic is investigated. Moreover, the theory of (n) similarity degrees among modal formulas is proposed and the (n) modal logic metric space is derived therefrom which contains the classical logic metric space as a subspace. Finally, a kind of approximate reasoning theory is proposed in modal logic. modal logic, (n) truth degrees, consistency theorem, temporal logic, (n) modality similarity degrees, (n) modality logic metric space, approximate reasoning

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A Brief Introduction to Probabilistically Quantitative Logic with Its Applications

Zhou

2016

Quantitative Logic and Soft Computing 2016

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An intrinsic fuzzy set on the universe of discourse of predicate formulas

Cited by 5 publications

References 15 publications

The validity degree vectors of formulae in two-valued predicate logic

The validity degree vectors of formulae in two-valued predicate logic

Theory of (n) truth degrees of formulas in modal logic and a consistency theorem

A Brief Introduction to Probabilistically Quantitative Logic with Its Applications

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