2015
DOI: 10.3233/ifs-151712
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Fuzzy arithmetic on LR fuzzy numbers with applications to fuzzy programming

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Cited by 64 publications
(60 citation statements)
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“…Therefore, 0.25em()120.25emαζ4+2αζ3x{}ζ4x2ζ4ζ3αCr{}trueζ~xα. When α>12 and Cr{}trueζ~xα, then we observe that either x ≤ ζ 1 or {}2ζ2xζ12ζ2ζ1α. Considering, each of the observed cases, we have (2 − 2 α ) ζ 2 + (2 α − 1) ζ 1 ≥ x . Conversely, when x < ζ 1 then Cr{}trueζ~x=1α. Now, ()220.25emαζ2+()2α1ζ1x{}2ζ2xζ12ζ2ζ1α, which eventually means 0.25emCr{}trueζ~xα. Definition (Zhou, Yang, & Wang, ): The regular credibility distribution of a GFN, trueζ~=scriptN(),ρnormalδ2 with membership function defined in , is represented as Cr{}trueζ~x={12italicexp{}...…”
Section: Preliminarymentioning
confidence: 90%
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“…Therefore, 0.25em()120.25emαζ4+2αζ3x{}ζ4x2ζ4ζ3αCr{}trueζ~xα. When α>12 and Cr{}trueζ~xα, then we observe that either x ≤ ζ 1 or {}2ζ2xζ12ζ2ζ1α. Considering, each of the observed cases, we have (2 − 2 α ) ζ 2 + (2 α − 1) ζ 1 ≥ x . Conversely, when x < ζ 1 then Cr{}trueζ~x=1α. Now, ()220.25emαζ2+()2α1ζ1x{}2ζ2xζ12ζ2ζ1α, which eventually means 0.25emCr{}trueζ~xα. Definition (Zhou, Yang, & Wang, ): The regular credibility distribution of a GFN, trueζ~=scriptN(),ρnormalδ2 with membership function defined in , is represented as Cr{}trueζ~x={12italicexp{}...…”
Section: Preliminarymentioning
confidence: 90%
“…Conversely, when x > ρ then 0.25emCr{}trueζ~xα0.25emis satisfied with 0.25emα120.25em. Accordingly, 0.25emnormalρ+normalδln()2αx[]12italicexp{}normalρxδ2α. This eventually means that normalρ+normalδln()2αxCr{}trueζ~xα.Definition (Liu & Liu, ): Let trueζ~ be a fuzzy variable on the possibility space (Θ, Γ(Θ), Pos), then the expected value of trueζ~ is defined as normalE[]ζtrue~bold-italic=0bold-italic+bold-italic∞Cr{}trueζ~xnormaldxbold-italic−bold-italic−bold-italic∞0Cr{}trueζ~xnormaldx provided that at least one of the two integrals is finite.Theorem (Zhou et al, ): Let trueζ~ be a fuzzy variable with inverse credibility distribution function Ψ −1 . If the expected value of trueζ~ exists, then normalE[]trueζ~0.25embold-italic=01…”
Section: Preliminarymentioning
confidence: 99%
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“…It is apparent that the overall AQI is also a fuzzy number. In order to achieve the concrete distribution of this fuzzy number, we introduce the following operational law put forward by Zhou et al [32]. Let ξ 1 , ξ 2 , · · · , ξ n be independent regular LRfuzzy numbers with credibility distributions Φ 1 , Φ 2 , · · · , Φ n , respectively.…”
Section: Fuzzy Air Quality Indexmentioning
confidence: 99%