. . . . . "Zbi\u00F3r stacjonarny"@pl . . "\uC815\uC0C1 \uC9D1\uD569"@ko . "Stacion\u00E1rn\u00ED mno\u017Eina je matematick\u00FD pojem z oblasti teorie mno\u017Ein, konkr\u00E9tn\u011B nekone\u010Dn\u00E9 kombinatoriky."@cs . . "Stacion\u00E1rn\u00ED mno\u017Eina je matematick\u00FD pojem z oblasti teorie mno\u017Ein, konkr\u00E9tn\u011B nekone\u010Dn\u00E9 kombinatoriky."@cs . "Zbiory domkni\u0119te nieograniczone (club) \u2013 rodzina podzbior\u00F3w liczby kardynalnej (traktowanej jako liczba porz\u0105dkowa) zawieraj\u0105ca zbiory w pewnym sensie du\u017Ce. Nazwa club jest skr\u00F3tem angielskiego terminu closed and unbounded. Niekt\u00F3rzy autorzy u\u017Cywaj\u0105 te\u017C nazwy c.u.b. (taka nazwa u\u017Cywana jest m.in. w monografii Kunena)"@pl . . "Stationary set"@en . . . "En teor\u00EDa de conjuntos y en teor\u00EDa de modelos existen tres nociones diferentes de conjunto estacionario: \n* Los . \n* Los . \n* Los ."@es . . . . "\uC9D1\uD569\uB860\uC5D0\uC11C \uD074\uB7FD \uC9D1\uD569(club\u96C6\u5408, \uC601\uC5B4: club set)\uC740 \uC8FC\uC5B4\uC9C4 \uC21C\uC11C\uC218\uBCF4\uB2E4 \uC791\uC740 \uC21C\uC11C\uC218\uB4E4 \uAC00\uC6B4\uB370 \"\uAC70\uC758 \uB300\uBD80\uBD84\"\uC744 \uD3EC\uD568\uD558\uB294 \uC9D1\uD569\uC774\uBA70, \uC815\uC0C1 \uC9D1\uD569(\u5B9A\u5E38\u96C6\u5408, \uC601\uC5B4: stationary set)\uC740 \uC8FC\uC5B4\uC9C4 \uC21C\uC11C\uC218\uBCF4\uB2E4 \uC791\uC740 \uC21C\uC11C\uC218\uB4E4 \uAC00\uC6B4\uB370 \"\uCDA9\uBD84\uD55C \uC218\"\uB97C \uD3EC\uD568\uD558\uC5EC, \uC784\uC758\uC758 \uD074\uB7FD \uC9D1\uD569\uACFC \uD558\uB098 \uC774\uC0C1\uC758 \uC6D0\uC18C\uB97C \uACF5\uC720\uD558\uB294 \uC9D1\uD569\uC774\uB2E4. \uC989, \uC774 \uB450 \uAC1C\uB150\uC758 \uAD00\uACC4\uB294 \uACF5\uC9D1\uD569\uC774 \uC544\uB2CC \uC5F4\uB9B0\uC9D1\uD569\uACFC \uC870\uBC00 \uC9D1\uD569\uC758 \uAD00\uACC4\uC640 \uAC19\uB2E4."@ko . "Ensemble stationnaire"@fr . . . "Conjunto estacion\u00E1rio"@pt . . . . . . "En math\u00E9matiques, en particulier en th\u00E9orie des ensembles et en th\u00E9orie des mod\u00E8les, un ensemble stationnaire est un ensemble qui n'est pas trop petit dans le sens o\u00F9 il croise tous les ensembles clubs, et est analogue \u00E0 un ensemble de mesure non nulle en th\u00E9orie des mesures."@fr . . . . . . . "StationarySet"@en . . . "Zbiory domkni\u0119te nieograniczone (club) \u2013 rodzina podzbior\u00F3w liczby kardynalnej (traktowanej jako liczba porz\u0105dkowa) zawieraj\u0105ca zbiory w pewnym sensie du\u017Ce. Nazwa club jest skr\u00F3tem angielskiego terminu closed and unbounded. Niekt\u00F3rzy autorzy u\u017Cywaj\u0105 te\u017C nazwy c.u.b. (taka nazwa u\u017Cywana jest m.in. w monografii Kunena)"@pl . . "1679067"^^ . . . "Em matem\u00E1tica, especialmente na teoria dos conjuntos e teoria dos modelos, h\u00E1 pelo menos tr\u00EAs no\u00E7\u00F5es de conjunto estacion\u00E1rio:"@pt . . "Stationary set"@en . . . . . . "Stacion\u00E1rn\u00ED mno\u017Eina"@cs . . "En teor\u00EDa de conjuntos y en teor\u00EDa de modelos existen tres nociones diferentes de conjunto estacionario: \n* Los . \n* Los . \n* Los ."@es . . . . . . "1124160690"^^ . "Em matem\u00E1tica, especialmente na teoria dos conjuntos e teoria dos modelos, h\u00E1 pelo menos tr\u00EAs no\u00E7\u00F5es de conjunto estacion\u00E1rio:"@pt . . . . . "In mathematics, specifically set theory and model theory, a stationary set is a set that is not too small in the sense that it intersects all club sets, and is analogous to a set of non-zero measure in measure theory. There are at least three closely related notions of stationary set, depending on whether one is looking at subsets of an ordinal, or subsets of something of given cardinality, or a powerset."@en . . "\uC9D1\uD569\uB860\uC5D0\uC11C \uD074\uB7FD \uC9D1\uD569(club\u96C6\u5408, \uC601\uC5B4: club set)\uC740 \uC8FC\uC5B4\uC9C4 \uC21C\uC11C\uC218\uBCF4\uB2E4 \uC791\uC740 \uC21C\uC11C\uC218\uB4E4 \uAC00\uC6B4\uB370 \"\uAC70\uC758 \uB300\uBD80\uBD84\"\uC744 \uD3EC\uD568\uD558\uB294 \uC9D1\uD569\uC774\uBA70, \uC815\uC0C1 \uC9D1\uD569(\u5B9A\u5E38\u96C6\u5408, \uC601\uC5B4: stationary set)\uC740 \uC8FC\uC5B4\uC9C4 \uC21C\uC11C\uC218\uBCF4\uB2E4 \uC791\uC740 \uC21C\uC11C\uC218\uB4E4 \uAC00\uC6B4\uB370 \"\uCDA9\uBD84\uD55C \uC218\"\uB97C \uD3EC\uD568\uD558\uC5EC, \uC784\uC758\uC758 \uD074\uB7FD \uC9D1\uD569\uACFC \uD558\uB098 \uC774\uC0C1\uC758 \uC6D0\uC18C\uB97C \uACF5\uC720\uD558\uB294 \uC9D1\uD569\uC774\uB2E4. \uC989, \uC774 \uB450 \uAC1C\uB150\uC758 \uAD00\uACC4\uB294 \uACF5\uC9D1\uD569\uC774 \uC544\uB2CC \uC5F4\uB9B0\uC9D1\uD569\uACFC \uC870\uBC00 \uC9D1\uD569\uC758 \uAD00\uACC4\uC640 \uAC19\uB2E4."@ko . . . . "Conjunto estacionario"@es . "\u6570\u5B66\u3001\u7279\u306B\u96C6\u5408\u8AD6\u3084\u30E2\u30C7\u30EB\u7406\u8AD6\u306B\u304A\u3044\u3066\u5B9A\u5E38\u96C6\u5408\uFF08\u3066\u3044\u3058\u3087\u3046\u3057\u3085\u3046\u3054\u3046\u3001\u82F1: stationary set\uFF09\u3068\u3044\u3046\u8A00\u8449\u306B\u306F\u5C11\u306A\u304F\u3068\u3082\u4E09\u3064\u306E\u7570\u306A\u308B\u610F\u5473\u304C\u3042\u308B\u3002:"@ja . . "\u6570\u5B66\u3001\u7279\u306B\u96C6\u5408\u8AD6\u3084\u30E2\u30C7\u30EB\u7406\u8AD6\u306B\u304A\u3044\u3066\u5B9A\u5E38\u96C6\u5408\uFF08\u3066\u3044\u3058\u3087\u3046\u3057\u3085\u3046\u3054\u3046\u3001\u82F1: stationary set\uFF09\u3068\u3044\u3046\u8A00\u8449\u306B\u306F\u5C11\u306A\u304F\u3068\u3082\u4E09\u3064\u306E\u7570\u306A\u308B\u610F\u5473\u304C\u3042\u308B\u3002:"@ja . . . . . "En math\u00E9matiques, en particulier en th\u00E9orie des ensembles et en th\u00E9orie des mod\u00E8les, un ensemble stationnaire est un ensemble qui n'est pas trop petit dans le sens o\u00F9 il croise tous les ensembles clubs, et est analogue \u00E0 un ensemble de mesure non nulle en th\u00E9orie des mesures."@fr . . . "In mathematics, specifically set theory and model theory, a stationary set is a set that is not too small in the sense that it intersects all club sets, and is analogous to a set of non-zero measure in measure theory. There are at least three closely related notions of stationary set, depending on whether one is looking at subsets of an ordinal, or subsets of something of given cardinality, or a powerset."@en . . . "\u5B9A\u5E38\u96C6\u5408"@ja . "6074"^^ . .