• 제목/요약/키워드: 유니놈

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An Axiomatic Extension of the Uninorm Logic Revisited (유니놈 논리의 확장을 재고함)

  • Yang, Eunsuk
    • Korean Journal of Logic
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    • v.17 no.2
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    • pp.323-349
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    • 2014
  • In this paper, we show that the standard completeness for the extension of UL with compensation-free reinforcement (cfr) $(({\phi}&{\psi}){\rightarrow}({\phi}{\wedge}{\psi})){\vee}(({\phi}{\vee}{\psi}){\rightarrow}({\phi}&{\psi}))$ can be established. More exactly, first, the compensation-freely reinforced uninorm logic $UL_{cfr}$ (the UL with (cfr)) is introduced. The algebraic structures of $UL_{cfr}$ are then defined, and its algebraic completeness is established. Next, standard completeness (i.e. completeness on [0, 1]) is established for $UL_{cfr}$ by using the method introduced in Yang (2009).

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Algebraic Kripke-style semantics for substructural fuzzy logics (준구조 퍼지 논리를 위한 대수적 크립키형 의미론)

  • Yang, Eunsuk
    • Korean Journal of Logic
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    • v.19 no.2
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    • pp.295-322
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    • 2016
  • This paper deals with Kripke-style semantics, which will be called algebraic Kripke-style semantics, for fuzzy logics based on uninorms (so called uninorm-based logics). First, we recall algebraic semantics for uninorm-based logics. In the general framework of uninorm-based logics, we next introduce various types of general algebraic Kripke-style semantics, and connect them with algebraic semantics. Finally, we analogously consider particular algebraic Kripke-style semantics, and also connect them with algebraic semantics.

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Weakly associative fuzzy logics (약한 결합 원리를 갖는 퍼지 논리)

  • Yang, Eunsuk
    • Korean Journal of Logic
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    • v.19 no.3
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    • pp.437-461
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    • 2016
  • This paper investigates weakening-free fuzzy logics with three weak forms of associativity (of multiplicative conjunction &). First, the wta-uninorm (based) logic $WA_tMUL$ and its two axiomatic extensions are introduced as weakening-free weakly associative fuzzy logics. The algebraic structures corresponding to the systems are then defined, and algebraic completeness results for them are provided. Next, standard completeness is established for $WA_tMUL$ and the two axiomatic extensions with an additional axiom using construction in the style of Jenei-Montagna.

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Set-Theoretical Kripke-Style Semantics for an Extension of HpsUL, CnHpsUL* (CnHpsUL*을 위한 집합 이론적 크립키형 의미론)

  • Yang, Eunsuk
    • Korean Journal of Logic
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    • v.21 no.1
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    • pp.39-57
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    • 2018
  • This paper deals with non-algebraic Kripke-style semantics, i.e, set-theoretical Kripke-style semantics, for weakening-free non-commutative fuzzy logics. We first recall an extension of the pseudo-uninorm based fuzzy logic HpsUL, $CnHpsUL^*$. We next introduce set-theoretical Kripke-style semantics for it.

A new proof of standard completeness for the uninorm logic UL (Uninorm 논리 UL을 위한 새로운 표준 완전성 증명)

  • Yang, Eun-Suk
    • Korean Journal of Logic
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    • v.13 no.1
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    • pp.1-20
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    • 2010
  • This paper investigates a new proof of standard completeness (i.e. completeness on the real unit interval [0, 1]) for the uninorm (based) logic UL introduced by Metcalfe and Montagna in [15]. More exactly, standard completeness is established for UL by using nuclear completions method introduced in [8, 9].

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Algebraic Kripke-style semantics for weakening-free fuzzy logics (약화없는 퍼지 논리를 위한 대수적 크립키형 의미론)

  • Yang, Eunsuk
    • Korean Journal of Logic
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    • v.17 no.1
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    • pp.181-196
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    • 2014
  • This paper deals with Kripke-style semantics for fuzzy logics. More exactly, I introduce algebraic Kripke-style semantics for some weakening-free extensions of the uninorm based fuzzy logic UL. For this, first, I introduce several weakening-free extensions of UL, define their corresponding algebraic structures, and give algebraic completeness. Next, I introduce several algebraic Kripke-style semantics for those systems, and connect these semantics with algebraic semantics.

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Standard Completeness for the Weak Uninorm Mingle Logic WUML (WUML의 표준적 완전성)

  • Yang, Eun-Suk
    • Korean Journal of Logic
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    • v.14 no.1
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    • pp.55-76
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    • 2011
  • Fixed-point conjunctive left-continuous idempotent uninorms have been introduced (see e.g. [2, 3]). This paper studies a system for such uninorms. More exactly, one system obtainable from IUML (Involutive uninorm mingle logic) by dropping involution (INV), called here WUML (Weak Uninorm Mingle Logic), is first introduced. This is the system of fixed-point conjunctive left-continuous idempotent uninorms and their residua with weak negation. Algebraic structures corresponding to the system, i.e., WUML-algebras, are then defined, and algebraic completeness is provided for the system. Standard completeness is further established for WUML and IUML in an analogy to that of WNM (Weak nilpotent minimum logic) and NM (Nilpotent minimum logic) in [4].

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Standard completeness results for some neighbors of R-mingle

  • Yang, Eun-Suk
    • Korean Journal of Logic
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    • v.11 no.2
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    • pp.171-197
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    • 2008
  • In this paper we deal with new standard completeness proofs of some systems introduced by Metcalfe and Montagna in [10]. For this, this paper investigates several fuzzy-relevance logics, which can be regarded as neighbors of the R of Relevance with mingle (RM). First, the monoidal uninorm idempotence logic MUIL, which is intended to cope with the tautologies of left-continuous conjunctive idempotent uninorms and their residua, and some schematic extensions of it are introduced as neighbors of RM. The algebraic structures corresponding to them are defined, and standard completeness, completeness on the real unit interval [0, 1], results for them are provided.

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On the Standard Completeness of an Axiomatic Extension of the Uninorm Logic

  • Yang, Eun-Suk
    • Korean Journal of Logic
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    • v.12 no.2
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    • pp.115-139
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    • 2009
  • This paper investigates an extension of the uninorm (based) logic UL, which is obtained by adding (t-weakening, $W_t$) (($\phi$ & $\psi$) ${\wedge}$ t) $\rightarrow$ $\phi$ to UL introduced by Metcalfe and Montagna in [8]. First, the t-weakening uninorm logic $UL_{Wt}$ (the UL with $W_t$) is introduced. The algebraic structures corresponding to $UL_{Wt}$ is then defined, and its algebraic completeness is established. Next standard completeness (i.e. completeness on the real unit interval [0, 1]) is established for this logic by using Jenei and Montagna-style approach for proving standard completeness in [3, 6].

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