• 제목/요약/키워드: Poset

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The Lattice of Interval-Valued Intuitionistic Fuzzy Relations

  • 이건창;최가희;허걸
    • 한국지능시스템학회논문지
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    • 제21권1호
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    • pp.145-152
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    • 2011
  • By using the notion of interval-valued intuitionistic fuzzy relations, we form the poset (IVIR(X), $\leq$) of interval-valued intuitionistic fuzzy relations on a given set X. In particular, we form the subposet (IVIE(X), $\leq$) of interval-valued intuitionistic fuzzy equivalence relations on a given set X and prove that the poset (IVIE(X), $\leq$) is a complete lattice with the least element and greatest element.

On the Representations of Finite Distributive Lattices

  • Siggers, Mark
    • Kyungpook Mathematical Journal
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    • 제60권1호
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    • pp.1-20
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    • 2020
  • A simple but elegant result of Rival states that every sublattice L of a finite distributive lattice 𝒫 can be constructed from 𝒫 by removing a particular family 𝒥L of its irreducible intervals. Applying this in the case that 𝒫 is a product of a finite set 𝒞 of chains, we get a one-to-one correspondence L ↦ 𝒟𝒫(L) between the sublattices of 𝒫 and the preorders spanned by a canonical sublattice 𝒞 of 𝒫. We then show that L is a tight sublattice of the product of chains 𝒫 if and only if 𝒟𝒫(L) is asymmetric. This yields a one-to-one correspondence between the tight sublattices of 𝒫 and the posets spanned by its poset J(𝒫) of non-zero join-irreducible elements. With this we recover and extend, among other classical results, the correspondence derived from results of Birkhoff and Dilworth, between the tight embeddings of a finite distributive lattice L into products of chains, and the chain decompositions of its poset J(L) of non-zero join-irreducible elements.

Γ - BCK-ALGEBRAS

  • Eun, Gwang Sik;Lee, Young Chan
    • 충청수학회지
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    • 제9권1호
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    • pp.11-15
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    • 1996
  • In this paper we prove that if Y is a poset of the form $\underline{1}{\oplus}Y^{\prime}$ for some subposet Y' then BCK(Y) is a ${\Gamma}$-BCK-algebra. Moreover, if X is a BCI-algebra then Hom(X, BCK(Y)) is a positive implicative ${\Gamma}$-BCK-algebra.

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COGRADIENTS IN FUZZY BCK-ALGEBRAS

  • Kim, Hee-Sik
    • 대한수학회보
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    • 제36권2호
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    • pp.343-349
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    • 1999
  • In this paper we apply the notion of $\rhd$$\mu$ and $\lhd$$\mu$ to fuzzy BCK-algebra, and show that $\lhd$$\mu$ is cogradient to a partial order of the BCK-algebra.

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Г-DEVIATION AND LOCALIZATION

  • Albu, Toma;Teply, Mark L.
    • 대한수학회지
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    • 제38권5호
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    • pp.937-954
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    • 2001
  • This paper is a natural continuation of [2], [3], [4] and [5]. Localization techniques for modular lattices are developed. These techniques are applied to study liftings of linear order types from quotient lattices and to find Г-dense sets in certain lattices without Г-deviation in the sense of [4], where Г is a set of indecomposable linear order types.

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GRAPHICAL ARRANGEMENTS OF COMPRESSED GRAPHS

  • Nguyen, Thi A.;Kim, Sangwook
    • 호남수학학술지
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    • 제36권1호
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    • pp.85-102
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    • 2014
  • We show that if a graph G is compressed, then the proper part of the intersection poset of the corresponding graphical arrangement $A_G$ has the homotopy type of a wedge of spheres. Furthermore, we also indicate the number of spheres in the wedge, based on the number of adjacent edges of vertices in G.

SOME FAMILIES OF IDEAL-HOMOGENEOUS POSETS

  • Chae, Gab-Byung;Cheong, Minseok;Kim, Sang-Mok
    • 대한수학회보
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    • 제53권4호
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    • pp.971-983
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    • 2016
  • A partially ordered set P is ideal-homogeneous provided that for any ideals I and J, if $$I{\sim_=}_{\sigma}J$$, then there exists an automorphism ${\sigma}^*$ such that ${\sigma}^*{\mid}_I={\sigma}$. Behrendt [1] characterizes the ideal-homogeneous partially ordered sets of height 1. In this paper, we characterize the ideal-homogeneous partially ordered sets of height 2 and nd some families of ideal-homogeneous partially ordered sets.

ON WEAKLY GRADED POSETS OF ORDER-PRESERVING MAPS UNDER THE NATURAL PARTIAL ORDER

  • Jitjankarn, Phichet
    • 대한수학회논문집
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    • 제35권2호
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    • pp.347-358
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    • 2020
  • In this paper, we simplify the natural partial ordering ≼ on the semigroup 𝒪([n]) under composition of all order-preserving maps on [n] = {1, …, n}, and describe its maximal elements. Also, we show that the poset (𝒪([n]), ≼) is weakly graded and determine when (𝒪([n]), ≼) has a structure of (i + 1)-avoidance.