The value of the four values

Arieli, Ofer; Avron, Arnon

doi:10.1016/s0004-3702(98)00032-0

Cited by 207 publications

(230 citation statements)

References 21 publications

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“…The common idea behind these approaches is that the negative information (reasons, values) is not just the complement of the positive one, but needs to be considered explicitly and formalised appropriately. In formal logic this idea has been further developing multi-valued logics and more precisely four-valued logics (see in [17], [18], [32], [100], [109], [106], [121], [155], [248], [253]). In the case of preference modelling, the use of such logics was first suggested in [252] and [82].…”

Section: Beyond Fuzzy Setsmentioning

confidence: 99%

Preferences in artificial intelligence

Pigozzi

Tsoukiàs

Viappiani

2015

Ann Math Artif Intell

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Section: Beyond Fuzzy Setsmentioning

confidence: 99%

Preferences in artificial intelligence

Pigozzi

Tsoukiàs

Viappiani

2015

Ann Math Artif Intell

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“…Compared to two truth values used by classical semantics, the set of truth values for four-valued semantics [13,14] contains four elements: true, false, unknown and both, written by t, f, N, B, respectively. The truth value B stands for contradictory information, hence four-valued logic leads itself to dealing with inconsistencies.…”

Section: Preliminariesmentioning

confidence: 99%

An Anytime Algorithm for Computing Inconsistency Measurement

Ma¹,

Xiao

et al. 2009

Lecture Notes in Computer Science

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Abstract. Measuring inconsistency degrees of inconsistent knowledge bases is an important problem as it provides context information for facilitating inconsistency handling. Many methods have been proposed to solve this problem and a main class of them is based on some kind of paraconsistent semantics. In this paper, we consider the computational aspects of inconsistency degrees of propositional knowledge bases under 4-valued semantics. We first analyze its computational complexity. As it turns out that computing the exact inconsistency degree is intractable, we then propose an anytime algorithm that provides tractable approximation of the inconsistency degree from above and below. We show that our algorithm satisfies some desirable properties and give experimental results of our implementation of the algorithm.

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“…In contrast to the internal implication ⊃ proposed in [2], our implication does not satisfy the Modus Ponens, if we assume that {t, i} is the set of designated values. For instance, i → f = i.…”

Section: → F U I T F T T T T U U U I T I I I I T T F U I Tmentioning

confidence: 87%

“…Moreover, we have then that i → u should also be defined as i. Other implication connectives have been proposed by other authors (see, e.g., [2]). Let us make a brief comparison.…”

Section: → F U I T F T T T T U U U I T I I I I T T F U I Tmentioning

confidence: 88%

“…when we only consider the logical values t and f. It also extends the implication of the Kleene three-valued logic [5,16] in the sense that when we restrict truth values to {t, f, u} (or {t, f, i}), we obtain Kleene's implication. On the other hand, our implication differs from the material implication → proposed in [2], on the following two cases: u → i = t while u → i = i and i → u = t while i → u = i. The material implication → can be defined by means of negation and disjunction.…”

Section: → F U I T F T T T T U U U I T I I I I T T F U I Tmentioning

confidence: 90%

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Four-Valued Extension of Rough Sets

Vitória

Szałas

Maluszynski

Rough Sets and Knowledge Technology

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Abstract. Rough set approximations of Pawlak [15] are sometimes generalized by using similarities between objects rather than elementary sets. In practical applications, both knowledge about properties of objects and knowledge of similarity between objects can be incomplete and inconsistent. The aim of this paper is to define set approximations when all sets, and their approximations, as well as similarity relations are four-valued. A set is four-valued in the sense that its membership function can have one of the four logical values: unknown (u), false (f), inconsistent (i), or true (t). To this end, a new implication operator and set-theoretical operations on four-valued sets, such as set containment, are introduced. Several properties of lower and upper approximations of four-valued sets are also presented.

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The value of the four values

Cited by 207 publications

References 21 publications

Preferences in artificial intelligence

Preferences in artificial intelligence

An Anytime Algorithm for Computing Inconsistency Measurement

Four-Valued Extension of Rough Sets

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