. . "Maille (th\u00E9orie des graphes)"@fr . . "\u570D\u9577 (\u5716\u8AD6)"@zh . "Em teoria dos grafos a cintura ou girth de um grafo \u00E9 o comprimento do mais curto ciclo contido no grafo. Se o grafo n\u00E3o cont\u00E9m ciclos (isto \u00E9, um grafo ac\u00EDclico), a sua cintura \u00E9 definida como infinita. Por exemplo, um 4-ciclo (quadrado), tem cintura 4. Uma grade tem cintura 4, igualmente, e uma malha triangular tem cintura 3. Um grafo com cintura >3 \u00E9 livre de tri\u00E2ngulos."@pt . . "Nella teoria dei grafi, il calibro (in inglese girth) di un grafo \u00E8 la lunghezza del ciclo pi\u00F9 corto contenuto nel grafo. Se il grafo non contiene alcun ciclo (\u00E8 cio\u00E8 un grafo aciclico), il suo calibro si definisce infinito.Ad esempio, un ciclo di ordine 4 (quadrato) ha calibro 4. Anche una griglia ha calibro 4, e una maglia triangolare ha calibro 3. Un grafo con calibro pari a 4 o superiore \u00E8 ."@it . . . . . "Cintura (teoria dos grafos)"@pt . "12013"^^ . . . "\u041E\u0431\u0445\u0432\u0430\u0442 \u0433\u0440\u0430\u0444\u0430 \u2014 \u0434\u043B\u0438\u043D\u0430 \u043D\u0430\u0438\u043C\u0435\u043D\u044C\u0448\u0435\u0433\u043E \u0446\u0438\u043A\u043B\u0430, \u0441\u043E\u0434\u0435\u0440\u0436\u0430\u0449\u0435\u0433\u043E\u0441\u044F \u0432 \u0434\u0430\u043D\u043D\u043E\u043C \u0433\u0440\u0430\u0444\u0435. \u0415\u0441\u043B\u0438 \u0433\u0440\u0430\u0444 \u043D\u0435 \u0441\u043E\u0434\u0435\u0440\u0436\u0438\u0442 \u0446\u0438\u043A\u043B\u043E\u0432 (\u0442\u043E \u0435\u0441\u0442\u044C \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u0430\u0446\u0438\u043A\u043B\u0438\u0447\u0435\u0441\u043A\u0438\u043C \u0433\u0440\u0430\u0444\u043E\u043C), \u0435\u0433\u043E \u043E\u0431\u0445\u0432\u0430\u0442 \u043F\u043E \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044E \u0440\u0430\u0432\u0435\u043D \u0431\u0435\u0441\u043A\u043E\u043D\u0435\u0447\u043D\u043E\u0441\u0442\u0438.\u041D\u0430\u043F\u0440\u0438\u043C\u0435\u0440, 4-\u0446\u0438\u043A\u043B (\u043A\u0432\u0430\u0434\u0440\u0430\u0442) \u0438\u043C\u0435\u0435\u0442 \u043E\u0431\u0445\u0432\u0430\u0442 4. \u041A\u0432\u0430\u0434\u0440\u0430\u0442\u043D\u0430\u044F \u0440\u0435\u0448\u0451\u0442\u043A\u0430 \u0438\u043C\u0435\u0435\u0442 \u0442\u0430\u043A\u0436\u0435 \u043E\u0431\u0445\u0432\u0430\u0442 4, \u0430 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0430\u044F \u0441\u0435\u0442\u043A\u0430 \u0438\u043C\u0435\u0435\u0442 \u043E\u0431\u0445\u0432\u0430\u0442 3. \u0413\u0440\u0430\u0444 \u0441 \u043E\u0431\u0445\u0432\u0430\u0442\u043E\u043C \u0447\u0435\u0442\u044B\u0440\u0435 \u0438 \u0431\u043E\u043B\u0435\u0435 \u043D\u0435 \u0438\u043C\u0435\u0435\u0442 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u043E\u0432."@ru . . . . . . . . . . . . . . "Talia grafu (ang. girth) \u2013 d\u0142ugo\u015B\u0107 najkr\u00F3tszego cyklu zawartego w grafie. Przyjmuje si\u0119, \u017Ce obw\u00F3d graf\u00F3w acyklicznych jest r\u00F3wny niesko\u0144czono\u015Bci. Np. cykl o d\u0142ugo\u015Bci 4 ma obw\u00F3d r\u00F3wny 4, tak jak wszystkie . \n* K3, obw\u00F3d 3 \n* K4, obw\u00F3d 3 \n* Graf Petersena, obw\u00F3d 5 \n* , obw\u00F3d 6 \n* , obw\u00F3d 8"@pl . . "\uADF8\uB798\uD504 \uC774\uB860\uACFC \uB9E4\uD2B8\uB85C\uC774\uB4DC \uC774\uB860\uC5D0\uC11C \uC548\uB458\uB808(\uC601\uC5B4: girth \uAC70\uC2A4[*])\uB294 \uADF8\uB798\uD504 \uB610\uB294 \uB9E4\uD2B8\uB85C\uC774\uB4DC \uC18D\uC758 \uAC00\uC7A5 \uC791\uC740 \u201C\uAD6C\uBA4D\u201D, \uC989 \uCD5C\uC18C\uC758 \uC21C\uD658\uC758 \uD06C\uAE30\uC774\uB2E4. \uB9C8\uCC2C\uAC00\uC9C0\uB85C \uADF8\uB798\uD504 \uB610\uB294 \uB9E4\uD2B8\uB85C\uC774\uB4DC\uC758 \uBC16\uB458\uB808(\uC601\uC5B4: circumference \uC11C\uCEF4\uD37C\uB7F0\uC2A4[*])\uB294 \uCD5C\uB300\uC758 \uC21C\uD658\uC758 \uD06C\uAE30\uC774\uB2E4."@ko . . . . . . "\uADF8\uB798\uD504 \uC774\uB860\uACFC \uB9E4\uD2B8\uB85C\uC774\uB4DC \uC774\uB860\uC5D0\uC11C \uC548\uB458\uB808(\uC601\uC5B4: girth \uAC70\uC2A4[*])\uB294 \uADF8\uB798\uD504 \uB610\uB294 \uB9E4\uD2B8\uB85C\uC774\uB4DC \uC18D\uC758 \uAC00\uC7A5 \uC791\uC740 \u201C\uAD6C\uBA4D\u201D, \uC989 \uCD5C\uC18C\uC758 \uC21C\uD658\uC758 \uD06C\uAE30\uC774\uB2E4. \uB9C8\uCC2C\uAC00\uC9C0\uB85C \uADF8\uB798\uD504 \uB610\uB294 \uB9E4\uD2B8\uB85C\uC774\uB4DC\uC758 \uBC16\uB458\uB808(\uC601\uC5B4: circumference \uC11C\uCEF4\uD37C\uB7F0\uC2A4[*])\uB294 \uCD5C\uB300\uC758 \uC21C\uD658\uC758 \uD06C\uAE30\uC774\uB2E4."@ko . . . "\uC548\uB458\uB808"@ko . . "En teor\u00EDa de grafos, la cintura\u200B (en ingl\u00E9s girth) de un grafo no dirigido es la longitud del ciclo m\u00E1s corto contenido en dicho grafo.\u200B Si el grafo no posee ciclos (es decir, es un grafo ac\u00EDclico), su cintura se define como infinita.\u200B Por ejemplo, un ciclo de cuatro v\u00E9rtices (cuadrado) tiene cintura 4. Un l\u00E1tice cuadrado tiene cintura 4. Una malla triangular tiene cintura 3. Si un grafo tiene contura mayor a tres, se dice que es libre de tri\u00E1ngulos. \n* El grafo de Petersen tiene cintura 5 \n* El grafo de Heawood tiene cintura de 6 \n* El grafo de McGee tiene cintura 7 \n* El grafo de Tutte-Coxeter tiene cintura 8"@es . . "\u041E\u0431\u0445\u0432\u0430\u0442 \u0432 \u0442\u0435\u043E\u0440\u0456\u0457 \u0433\u0440\u0430\u0444\u0456\u0432 \u2014 \u0434\u043E\u0432\u0436\u0438\u043D\u0430 \u043D\u0430\u0439\u043A\u043E\u0440\u043E\u0442\u0448\u043E\u0433\u043E \u0446\u0438\u043A\u043B\u0443, \u0449\u043E \u043C\u0456\u0441\u0442\u0438\u0442\u044C\u0441\u044F \u0432 \u0437\u0430\u0434\u0430\u043D\u043E\u043C\u0443 \u0433\u0440\u0430\u0444\u0456. \u042F\u043A\u0449\u043E \u0433\u0440\u0430\u0444 \u043D\u0435 \u043C\u0456\u0441\u0442\u0438\u0442\u044C \u0446\u0438\u043A\u043B\u0456\u0432 (\u0442\u043E\u0431\u0442\u043E \u0454 \u0430\u0446\u0438\u043A\u043B\u0456\u0447\u043D\u0438\u043C \u0433\u0440\u0430\u0444\u043E\u043C), \u0439\u043E\u0433\u043E \u043E\u0431\u0445\u0432\u0430\u0442 \u0437\u0430 \u0432\u0438\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F\u043C \u0434\u043E\u0440\u0456\u0432\u043D\u044E\u0454 \u043D\u0435\u0441\u043A\u0456\u043D\u0447\u0435\u043D\u043D\u043E\u0441\u0442\u0456.\u041D\u0430\u043F\u0440\u0438\u043A\u043B\u0430\u0434, 4-\u0446\u0438\u043A\u043B (\u043A\u0432\u0430\u0434\u0440\u0430\u0442) \u043C\u0430\u0454 \u043E\u0431\u0445\u0432\u0430\u0442 4. \u041A\u0432\u0430\u0434\u0440\u0430\u0442\u043D\u0430 \u0491\u0440\u0430\u0442\u043A\u0430 \u043C\u0430\u0454 \u0442\u0430\u043A\u043E\u0436 \u043E\u0431\u0445\u0432\u0430\u0442 4, \u0430 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0430 \u0441\u0456\u0442\u043A\u0430 \u043C\u0430\u0454 \u043E\u0431\u0445\u0432\u0430\u0442 3. \u0413\u0440\u0430\u0444 \u0437 \u043E\u0431\u0445\u0432\u0430\u0442\u043E\u043C \u0447\u043E\u0442\u0438\u0440\u0438 \u0456 \u0431\u0456\u043B\u044C\u0448\u0435 \u043D\u0435 \u043C\u0456\u0441\u0442\u0438\u0442\u044C \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A\u0456\u0432."@uk . . . . . "\u5728\u56FE\u8BBA\u4E2D\uFF0C\u4E00\u500B\u5716\u7684\u570D\u9577\u5B9A\u7FA9\u70BA\u9019\u500B\u5716\u6240\u5305\u542B\u7684\u6700\u77ED\u74B0\u9577\u3002 \u82E5\u9019\u500B\u5716\u662F\uFF0C\u5B83\u7684\u570D\u9577\u5247\u5B9A\u7FA9\u505A\u7121\u7AAE\u5927\u3002 \u8209\u4F8B\u4F86\u8AAA\uFF0C4-\u74B0\uFF08\u6B63\u65B9\u5F62\uFF09\u7684\u570D\u9577\u662F 4\u3002"@zh . . . "Talia grafu"@pl . . . . . . . "Em teoria dos grafos a cintura ou girth de um grafo \u00E9 o comprimento do mais curto ciclo contido no grafo. Se o grafo n\u00E3o cont\u00E9m ciclos (isto \u00E9, um grafo ac\u00EDclico), a sua cintura \u00E9 definida como infinita. Por exemplo, um 4-ciclo (quadrado), tem cintura 4. Uma grade tem cintura 4, igualmente, e uma malha triangular tem cintura 3. Um grafo com cintura >3 \u00E9 livre de tri\u00E2ngulos."@pt . . "Talia grafu (ang. girth) \u2013 d\u0142ugo\u015B\u0107 najkr\u00F3tszego cyklu zawartego w grafie. Przyjmuje si\u0119, \u017Ce obw\u00F3d graf\u00F3w acyklicznych jest r\u00F3wny niesko\u0144czono\u015Bci. Np. cykl o d\u0142ugo\u015Bci 4 ma obw\u00F3d r\u00F3wny 4, tak jak wszystkie . \n* K3, obw\u00F3d 3 \n* K4, obw\u00F3d 3 \n* Graf Petersena, obw\u00F3d 5 \n* , obw\u00F3d 6 \n* , obw\u00F3d 8"@pl . . . . "\u0641\u064A \u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0631\u0633\u0648\u0645\u0627\u062A \u060C \u0645\u0642\u0627\u0633 \u0645\u062D\u064A\u0637 ( \u0627\u0644\u0645\u0642\u0627\u0633 \u0623\u062E\u062A\u0635\u0627\u0631\u0627) (girth) \u0631\u0633\u0645 \u0628\u064A\u0627\u0646\u064A \u0647\u0648 \u0637\u0648\u0644 \u0623\u0642\u0635\u0631 \u062F\u0648\u0631\u0629 \u0641\u064A \u0627\u0644\u0631\u0633\u0645 \u0627\u0644\u0628\u064A\u0627\u0646\u064A. \u0625\u0630\u0627 \u0643\u0627\u0646 \u0627\u0644\u0631\u0633\u0645 \u0627\u0644\u0628\u064A\u0627\u0646\u064A \u0644\u0627 \u064A\u062D\u062A\u0648\u064A \u0639\u0644\u0649 \u0623\u064A \u062F\u0648\u0631\u0627\u062A (\u0623\u064A \u0623\u0646\u0647 \u0631\u0633\u0645 \u0628\u064A\u0627\u0646\u064A \u0628\u062F\u0648\u0646 \u062F\u0648\u0631\u0647\u060C \u0641\u0633\u064A\u062A\u0645 \u062A\u0639\u0631\u064A\u0641 \u0627\u0644\u0645\u0642\u0627\u0633 \u0628\u0623\u0646\u0647 \u0627\u0644\u0644\u0627\u0646\u0647\u0627\u064A\u0629 . \u0639\u0644\u0649 \u0633\u0628\u064A\u0644 \u0627\u0644\u0645\u062B\u0627\u0644\u060C \u062F\u0648\u0631\u0629 \u0637\u0648\u0644\u0647\u06274 (\u062A\u0627\u062E\u0630 \u0634\u0643\u0644 \u0627\u0644\u0645\u0631\u0628\u0639) \u0628\u0647\u0627 \u0645\u0642\u0627\u0633 \u0627\u0644\u0645\u062D\u064A\u0637 4 \u0648\u0642\u064A\u0627\u0633 \u0645\u062D\u064A\u0637 \u0627\u0644\u0645\u062B\u0644\u062B \u064A\u0633\u0627\u0648\u064A 4 \u0623\u064A\u0636\u0627\u060C \u0648\u0634\u0628\u0643\u0629 \u0627\u0644\u062B\u0644\u0627\u062B\u064A \u0644\u062F\u064A\u0647\u0627 \u062D\u0632\u0627\u0645 3. \u0641\u0628\u0627\u0644\u062A\u0627\u0644\u064A \u0623\u064A \u0631\u0633\u0645 \u0628\u064A\u0627\u0646\u064A \u0628\u0647 \u0637\u0648\u0644 \u0645\u062D\u064A\u0637\u0647 \u064A\u0633\u0627\u0648\u064A \u0623\u0631\u0628\u0639\u0629 \u0623\u0648 \u0623\u0643\u062B\u0631 \u064A\u0639\u062A\u0628\u0631 \u0631\u0633\u0645 \u0628\u062F\u0648\u0646 \u0645\u062B\u0644\u062B\u0627\u062A ."@ar . "Calibro (teoria dei grafi)"@it . . . . "5459"^^ . . . "En teor\u00EDa de grafos, la cintura\u200B (en ingl\u00E9s girth) de un grafo no dirigido es la longitud del ciclo m\u00E1s corto contenido en dicho grafo.\u200B Si el grafo no posee ciclos (es decir, es un grafo ac\u00EDclico), su cintura se define como infinita.\u200B Por ejemplo, un ciclo de cuatro v\u00E9rtices (cuadrado) tiene cintura 4. Un l\u00E1tice cuadrado tiene cintura 4. Una malla triangular tiene cintura 3. Si un grafo tiene contura mayor a tres, se dice que es libre de tri\u00E1ngulos. \n* El grafo de Petersen tiene cintura 5 \n* El grafo de Heawood tiene cintura de 6 \n* El grafo de McGee tiene cintura 7 \n*"@es . . "\u041E\u0431\u0445\u0432\u0430\u0442 (\u0442\u0435\u043E\u0440\u0456\u044F \u0433\u0440\u0430\u0444\u0456\u0432)"@uk . "\u0645\u0642\u0627\u0633 \u0627\u0644\u0645\u062D\u064A\u0637 (\u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0631\u0633\u0648\u0645\u0627\u062A)"@ar . . . . . "\u041E\u0431\u0445\u0432\u0430\u0442 (\u0442\u0435\u043E\u0440\u0438\u044F \u0433\u0440\u0430\u0444\u043E\u0432)"@ru . "\u0641\u064A \u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0631\u0633\u0648\u0645\u0627\u062A \u060C \u0645\u0642\u0627\u0633 \u0645\u062D\u064A\u0637 ( \u0627\u0644\u0645\u0642\u0627\u0633 \u0623\u062E\u062A\u0635\u0627\u0631\u0627) (girth) \u0631\u0633\u0645 \u0628\u064A\u0627\u0646\u064A \u0647\u0648 \u0637\u0648\u0644 \u0623\u0642\u0635\u0631 \u062F\u0648\u0631\u0629 \u0641\u064A \u0627\u0644\u0631\u0633\u0645 \u0627\u0644\u0628\u064A\u0627\u0646\u064A. \u0625\u0630\u0627 \u0643\u0627\u0646 \u0627\u0644\u0631\u0633\u0645 \u0627\u0644\u0628\u064A\u0627\u0646\u064A \u0644\u0627 \u064A\u062D\u062A\u0648\u064A \u0639\u0644\u0649 \u0623\u064A \u062F\u0648\u0631\u0627\u062A (\u0623\u064A \u0623\u0646\u0647 \u0631\u0633\u0645 \u0628\u064A\u0627\u0646\u064A \u0628\u062F\u0648\u0646 \u062F\u0648\u0631\u0647\u060C \u0641\u0633\u064A\u062A\u0645 \u062A\u0639\u0631\u064A\u0641 \u0627\u0644\u0645\u0642\u0627\u0633 \u0628\u0623\u0646\u0647 \u0627\u0644\u0644\u0627\u0646\u0647\u0627\u064A\u0629 . \u0639\u0644\u0649 \u0633\u0628\u064A\u0644 \u0627\u0644\u0645\u062B\u0627\u0644\u060C \u062F\u0648\u0631\u0629 \u0637\u0648\u0644\u0647\u06274 (\u062A\u0627\u062E\u0630 \u0634\u0643\u0644 \u0627\u0644\u0645\u0631\u0628\u0639) \u0628\u0647\u0627 \u0645\u0642\u0627\u0633 \u0627\u0644\u0645\u062D\u064A\u0637 4 \u0648\u0642\u064A\u0627\u0633 \u0645\u062D\u064A\u0637 \u0627\u0644\u0645\u062B\u0644\u062B \u064A\u0633\u0627\u0648\u064A 4 \u0623\u064A\u0636\u0627\u060C \u0648\u0634\u0628\u0643\u0629 \u0627\u0644\u062B\u0644\u0627\u062B\u064A \u0644\u062F\u064A\u0647\u0627 \u062D\u0632\u0627\u0645 3. \u0641\u0628\u0627\u0644\u062A\u0627\u0644\u064A \u0623\u064A \u0631\u0633\u0645 \u0628\u064A\u0627\u0646\u064A \u0628\u0647 \u0637\u0648\u0644 \u0645\u062D\u064A\u0637\u0647 \u064A\u0633\u0627\u0648\u064A \u0623\u0631\u0628\u0639\u0629 \u0623\u0648 \u0623\u0643\u062B\u0631 \u064A\u0639\u062A\u0628\u0631 \u0631\u0633\u0645 \u0628\u062F\u0648\u0646 \u0645\u062B\u0644\u062B\u0627\u062A ."@ar . "\u5185\u5468 (\u30B0\u30E9\u30D5\u7406\u8AD6)"@ja . "Girth (graph theory)"@en . . "\u041E\u0431\u0445\u0432\u0430\u0442 \u0433\u0440\u0430\u0444\u0430 \u2014 \u0434\u043B\u0438\u043D\u0430 \u043D\u0430\u0438\u043C\u0435\u043D\u044C\u0448\u0435\u0433\u043E \u0446\u0438\u043A\u043B\u0430, \u0441\u043E\u0434\u0435\u0440\u0436\u0430\u0449\u0435\u0433\u043E\u0441\u044F \u0432 \u0434\u0430\u043D\u043D\u043E\u043C \u0433\u0440\u0430\u0444\u0435. \u0415\u0441\u043B\u0438 \u0433\u0440\u0430\u0444 \u043D\u0435 \u0441\u043E\u0434\u0435\u0440\u0436\u0438\u0442 \u0446\u0438\u043A\u043B\u043E\u0432 (\u0442\u043E \u0435\u0441\u0442\u044C \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u0430\u0446\u0438\u043A\u043B\u0438\u0447\u0435\u0441\u043A\u0438\u043C \u0433\u0440\u0430\u0444\u043E\u043C), \u0435\u0433\u043E \u043E\u0431\u0445\u0432\u0430\u0442 \u043F\u043E \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044E \u0440\u0430\u0432\u0435\u043D \u0431\u0435\u0441\u043A\u043E\u043D\u0435\u0447\u043D\u043E\u0441\u0442\u0438.\u041D\u0430\u043F\u0440\u0438\u043C\u0435\u0440, 4-\u0446\u0438\u043A\u043B (\u043A\u0432\u0430\u0434\u0440\u0430\u0442) \u0438\u043C\u0435\u0435\u0442 \u043E\u0431\u0445\u0432\u0430\u0442 4. \u041A\u0432\u0430\u0434\u0440\u0430\u0442\u043D\u0430\u044F \u0440\u0435\u0448\u0451\u0442\u043A\u0430 \u0438\u043C\u0435\u0435\u0442 \u0442\u0430\u043A\u0436\u0435 \u043E\u0431\u0445\u0432\u0430\u0442 4, \u0430 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0430\u044F \u0441\u0435\u0442\u043A\u0430 \u0438\u043C\u0435\u0435\u0442 \u043E\u0431\u0445\u0432\u0430\u0442 3. \u0413\u0440\u0430\u0444 \u0441 \u043E\u0431\u0445\u0432\u0430\u0442\u043E\u043C \u0447\u0435\u0442\u044B\u0440\u0435 \u0438 \u0431\u043E\u043B\u0435\u0435 \u043D\u0435 \u0438\u043C\u0435\u0435\u0442 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u043E\u0432."@ru . . . . . . "En th\u00E9orie des graphes, la maille d'un graphe est la longueur du plus court de ses cycles. Un graphe acyclique est g\u00E9n\u00E9ralement consid\u00E9r\u00E9 comme ayant une maille infinie (ou, pour certains auteurs, une maille de \u22121)."@fr . . . . "En th\u00E9orie des graphes, la maille d'un graphe est la longueur du plus court de ses cycles. Un graphe acyclique est g\u00E9n\u00E9ralement consid\u00E9r\u00E9 comme ayant une maille infinie (ou, pour certains auteurs, une maille de \u22121)."@fr . "\u6570\u5B66\u306E\u30B0\u30E9\u30D5\u7406\u8AD6\u306E\u5206\u91CE\u306B\u304A\u3051\u308B\u5185\u5468\uFF08\u306A\u3044\u3057\u3085\u3046\u3001\u82F1: girth\uFF09\u3068\u306F\u3001\u30B0\u30E9\u30D5\u306B\u542B\u307E\u308C\u308B\u6700\u5C0F\u306E\u9589\u8DEF\u306E\u9577\u3055\u306E\u3053\u3068\u3092\u8A00\u3046\u3002\u3082\u3057\u3082\u30B0\u30E9\u30D5\u304C\u9589\u8DEF\u3092\u542B\u307E\u306A\u3044\u306A\u3089\uFF08\u3059\u306A\u308F\u3061\u3001\u7121\u9589\u8DEF\u30B0\u30E9\u30D5\u3067\u3042\u308B\u306A\u3089\uFF09\u3001\u305D\u306E\u5185\u5468\u306F\u7121\u9650\u5927\u3068\u5B9A\u7FA9\u3055\u308C\u308B\u3002\u4F8B\u3048\u3070\u3001\uFF08\u5E73\u65B9\uFF094-\u9589\u8DEF\u30B0\u30E9\u30D5\u306E\u5185\u5468\u306F4\u3067\u3042\u308B\u3002\u683C\u5B50\u30B0\u30E9\u30D5\u306E\u5185\u5468\u30824\u3067\u3042\u308B\u3002\u4E09\u89D2\u5F62\u30E1\u30C3\u30B7\u30E5\u306E\u5185\u5468\u306F3\u3067\u3042\u308B\u3002\u5185\u5468\u304C4\u4EE5\u4E0A\u306E\u30B0\u30E9\u30D5\u306F\u3001\u3067\u3042\u308B\u3002"@ja . . "1114774710"^^ . . . . "Cintura (teor\u00EDa de grafos)"@es . . . "\u5728\u56FE\u8BBA\u4E2D\uFF0C\u4E00\u500B\u5716\u7684\u570D\u9577\u5B9A\u7FA9\u70BA\u9019\u500B\u5716\u6240\u5305\u542B\u7684\u6700\u77ED\u74B0\u9577\u3002 \u82E5\u9019\u500B\u5716\u662F\uFF0C\u5B83\u7684\u570D\u9577\u5247\u5B9A\u7FA9\u505A\u7121\u7AAE\u5927\u3002 \u8209\u4F8B\u4F86\u8AAA\uFF0C4-\u74B0\uFF08\u6B63\u65B9\u5F62\uFF09\u7684\u570D\u9577\u662F 4\u3002"@zh . "In graph theory, the girth of an undirected graph is the length of a shortest cycle contained in the graph. If the graph does not contain any cycles (that is, it is a forest), its girth is defined to be infinity.For example, a 4-cycle (square) has girth 4. A grid has girth 4 as well, and a triangular mesh has girth 3. A graph with girth four or more is triangle-free."@en . . "Nella teoria dei grafi, il calibro (in inglese girth) di un grafo \u00E8 la lunghezza del ciclo pi\u00F9 corto contenuto nel grafo. Se il grafo non contiene alcun ciclo (\u00E8 cio\u00E8 un grafo aciclico), il suo calibro si definisce infinito.Ad esempio, un ciclo di ordine 4 (quadrato) ha calibro 4. Anche una griglia ha calibro 4, e una maglia triangolare ha calibro 3. Un grafo con calibro pari a 4 o superiore \u00E8 ."@it . . . "In graph theory, the girth of an undirected graph is the length of a shortest cycle contained in the graph. If the graph does not contain any cycles (that is, it is a forest), its girth is defined to be infinity.For example, a 4-cycle (square) has girth 4. A grid has girth 4 as well, and a triangular mesh has girth 3. A graph with girth four or more is triangle-free."@en . . . . "\u6570\u5B66\u306E\u30B0\u30E9\u30D5\u7406\u8AD6\u306E\u5206\u91CE\u306B\u304A\u3051\u308B\u5185\u5468\uFF08\u306A\u3044\u3057\u3085\u3046\u3001\u82F1: girth\uFF09\u3068\u306F\u3001\u30B0\u30E9\u30D5\u306B\u542B\u307E\u308C\u308B\u6700\u5C0F\u306E\u9589\u8DEF\u306E\u9577\u3055\u306E\u3053\u3068\u3092\u8A00\u3046\u3002\u3082\u3057\u3082\u30B0\u30E9\u30D5\u304C\u9589\u8DEF\u3092\u542B\u307E\u306A\u3044\u306A\u3089\uFF08\u3059\u306A\u308F\u3061\u3001\u7121\u9589\u8DEF\u30B0\u30E9\u30D5\u3067\u3042\u308B\u306A\u3089\uFF09\u3001\u305D\u306E\u5185\u5468\u306F\u7121\u9650\u5927\u3068\u5B9A\u7FA9\u3055\u308C\u308B\u3002\u4F8B\u3048\u3070\u3001\uFF08\u5E73\u65B9\uFF094-\u9589\u8DEF\u30B0\u30E9\u30D5\u306E\u5185\u5468\u306F4\u3067\u3042\u308B\u3002\u683C\u5B50\u30B0\u30E9\u30D5\u306E\u5185\u5468\u30824\u3067\u3042\u308B\u3002\u4E09\u89D2\u5F62\u30E1\u30C3\u30B7\u30E5\u306E\u5185\u5468\u306F3\u3067\u3042\u308B\u3002\u5185\u5468\u304C4\u4EE5\u4E0A\u306E\u30B0\u30E9\u30D5\u306F\u3001\u3067\u3042\u308B\u3002"@ja . . . "\u041E\u0431\u0445\u0432\u0430\u0442 \u0432 \u0442\u0435\u043E\u0440\u0456\u0457 \u0433\u0440\u0430\u0444\u0456\u0432 \u2014 \u0434\u043E\u0432\u0436\u0438\u043D\u0430 \u043D\u0430\u0439\u043A\u043E\u0440\u043E\u0442\u0448\u043E\u0433\u043E \u0446\u0438\u043A\u043B\u0443, \u0449\u043E \u043C\u0456\u0441\u0442\u0438\u0442\u044C\u0441\u044F \u0432 \u0437\u0430\u0434\u0430\u043D\u043E\u043C\u0443 \u0433\u0440\u0430\u0444\u0456. \u042F\u043A\u0449\u043E \u0433\u0440\u0430\u0444 \u043D\u0435 \u043C\u0456\u0441\u0442\u0438\u0442\u044C \u0446\u0438\u043A\u043B\u0456\u0432 (\u0442\u043E\u0431\u0442\u043E \u0454 \u0430\u0446\u0438\u043A\u043B\u0456\u0447\u043D\u0438\u043C \u0433\u0440\u0430\u0444\u043E\u043C), \u0439\u043E\u0433\u043E \u043E\u0431\u0445\u0432\u0430\u0442 \u0437\u0430 \u0432\u0438\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F\u043C \u0434\u043E\u0440\u0456\u0432\u043D\u044E\u0454 \u043D\u0435\u0441\u043A\u0456\u043D\u0447\u0435\u043D\u043D\u043E\u0441\u0442\u0456.\u041D\u0430\u043F\u0440\u0438\u043A\u043B\u0430\u0434, 4-\u0446\u0438\u043A\u043B (\u043A\u0432\u0430\u0434\u0440\u0430\u0442) \u043C\u0430\u0454 \u043E\u0431\u0445\u0432\u0430\u0442 4. \u041A\u0432\u0430\u0434\u0440\u0430\u0442\u043D\u0430 \u0491\u0440\u0430\u0442\u043A\u0430 \u043C\u0430\u0454 \u0442\u0430\u043A\u043E\u0436 \u043E\u0431\u0445\u0432\u0430\u0442 4, \u0430 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0430 \u0441\u0456\u0442\u043A\u0430 \u043C\u0430\u0454 \u043E\u0431\u0445\u0432\u0430\u0442 3. \u0413\u0440\u0430\u0444 \u0437 \u043E\u0431\u0445\u0432\u0430\u0442\u043E\u043C \u0447\u043E\u0442\u0438\u0440\u0438 \u0456 \u0431\u0456\u043B\u044C\u0448\u0435 \u043D\u0435 \u043C\u0456\u0441\u0442\u0438\u0442\u044C \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A\u0456\u0432."@uk .