. . . . . . . . . . "1859-05-05"^^ . . . . . . . . . . . . "Partial Results on Fermat's Last Theorem, Exponent 5"@en . . . . . . "\u0419\u043E\u0301\u0433\u0430\u043D\u043D \u041F\u0435\u0301\u0442\u0435\u0440 \u0413\u0443\u0301\u0441\u0442\u0430\u0432 \u041B\u0435\u0436\u0435\u043D \u0414\u0456\u0440\u0456\u0445\u043B\u0435\u0301 (\u043D\u0456\u043C. Johann Peter Gustav Lejeune Dirichlet; 13 \u043B\u044E\u0442\u043E\u0433\u043E 1805, \u0414\u044E\u0440\u0435\u043D, \u0424\u0440\u0430\u043D\u0446\u0456\u044F, \u0437\u0430\u0440\u0430\u0437 \u041D\u0456\u043C\u0435\u0447\u0447\u0438\u043D\u0430 \u2014 5 \u0442\u0440\u0430\u0432\u043D\u044F 1859, \u0413\u0435\u0442\u0442\u0456\u043D\u0433\u0435\u043D, \u0413\u0430\u043D\u043D\u043E\u0432\u0435\u0440) \u2014 \u043D\u0456\u043C\u0435\u0446\u044C\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u0432\u0456\u0434\u043E\u043C\u0438\u0439 \u0437\u043D\u0430\u0447\u043D\u0438\u043C \u0432\u043D\u0435\u0441\u043A\u043E\u043C \u0434\u043E \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u0447\u043D\u0438\u0439 \u0430\u043D\u0430\u043B\u0456\u0437, \u0442\u0435\u043E\u0440\u0456\u044E \u0444\u0443\u043D\u043A\u0446\u0456\u0439 \u043A\u043E\u043C\u043F\u043B\u0435\u043A\u0441\u043D\u043E\u0457 \u0437\u043C\u0456\u043D\u043D\u043E\u0457 \u0442\u0430 \u0442\u0435\u043E\u0440\u0456\u044E \u0447\u0438\u0441\u0435\u043B."@uk . . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet, f\u00F6dd 13 februari 1805 i D\u00FCren, d\u00F6d 5 maj 1859 i G\u00F6ttingen, var en tysk matematiker som tillskrivits definitionen av det moderna, allm\u00E4nna funktionsbegreppet. Dirichlet och hans sl\u00E4kt h\u00E4rstammade fr\u00E5n i Belgien vilket givit honom hans namn \"le jeune de Richelet\", det vill s\u00E4ga \"den unge fr\u00E5n Richelet\". Dirichlet f\u00F6ddes i D\u00FCren d\u00E4r hans far var postm\u00E4stare. Han var gift med , barnbarn till filosofen Moses Mendelssohn och syster till komposit\u00F6ren Felix Mendelssohn-Bartholdy."@sv . . . . . "Johann Peter Gustav Lejeune Dirichlet (13 Februari 1805 \u2013 5 Mei 1859) ialah matematikawan Jerman yang dihargai karena definisi \"formal\" modern dari fungsi. Keluarganya berasal dari kota di Belgia, dari yang nama belakangnya \"Lejeune Dirichlet\" (\"le jeune de Richelet\" = \"anak muda dari Richelet\") diturunkan, dan di mana kakeknya tinggal. Ia menikahi , yang berasal dari keluarga Yahudi berpengaruh, menjadi cucu filsuf Moses Mendelssohn, dan saudari komponis Felix Mendelssohn."@in . . . . . . . . . . . . . . . . . . . . . . "\u0414\u0438\u0440\u0438\u0445\u043B\u0435, \u041F\u0435\u0442\u0435\u0440 \u0413\u0443\u0441\u0442\u0430\u0432 \u041B\u0435\u0436\u0451\u043D"@ru . . "\u7D04\u7FF0\u00B7\u5F7C\u5F97\u00B7\u53E4\u65AF\u5854\u592B\u00B7\u52D2\u71B1\u7D0D\u00B7\u72C4\u5229\u514B\u96F7"@zh . "1805-02-13"^^ . . "Peter Gustav Lejeune Dirichlet"@de . "1122249749"^^ . . . . "Peter Gustav Lejeune Dirichlet"@en . . . . . . . . . . . . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet (13. \u00FAnor 1805 \u2013 5. kv\u011Bten 1859) byl n\u011Bmeck\u00FD matematik. Zasahoval aktivn\u011B do teorie \u010D\u00EDsel, matematick\u00E9 anal\u00FDzy i matematick\u00E9 statistiky. Jeho jm\u00E9nem je nazv\u00E1no , Dirichletova funkce, Dirichlet\u016Fv princip apod."@cs . . . . . "Johann Peter Gustav Lejeune Dirichlet (13 f\u00E9vrier 1805, D\u00FCren \u2013 5 mai 1859, G\u00F6ttingen) est un math\u00E9maticien prussien qui apporta de profondes contributions \u00E0 la th\u00E9orie des nombres, en cr\u00E9ant le domaine de la th\u00E9orie analytique des nombres et \u00E0 la th\u00E9orie des s\u00E9ries de Fourier. On lui doit d'autres avanc\u00E9es en analyse math\u00E9matique. On lui attribue la d\u00E9finition formelle moderne d'une fonction."@fr . . . . "\u064A\u0648\u0647\u0627\u0646 \u0628\u064A\u062A\u0631 \u063A\u0648\u0633\u062A\u0627\u0641 \u0644\u0648\u062C\u0648\u0646 \u062F\u0631\u0643\u0644\u064A\u0647 (\u0628\u0627\u0644\u0623\u0644\u0645\u0627\u0646\u064A\u0629: Peter Gustav Lejeune Dirichlet) \u0647\u0648 \u0639\u0627\u0644\u0645 \u0631\u064A\u0627\u0636\u064A\u0627\u062A \u0623\u0644\u0645\u0627\u0646\u064A. \u0648\u0644\u062F \u0641\u064A \u0627\u0644\u062B\u0627\u0644\u062B \u0639\u0634\u0631 \u0645\u0646 \u0641\u0628\u0631\u0627\u064A\u0631 \u0639\u0627\u0645 1805 \u0648\u062A\u0648\u0641\u064A \u0641\u064A \u0627\u0644\u062E\u0627\u0645\u0633 \u0645\u0646 \u0645\u0627\u064A \u0639\u0627\u0645 1859 \u0639\u0646 \u0639\u0645\u0631 \u064A\u0646\u0627\u0647\u0632 \u0627\u0644\u0623\u0631\u0628\u0639\u0629 \u0648 \u0627\u0644\u062E\u0645\u0633\u064A\u0646 \u0639\u0627\u0645\u0627. \u0644\u0647 \u0645\u0633\u0627\u0647\u0645\u0627\u062A \u0639\u0645\u064A\u0642\u0629 \u0641\u064A \u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0623\u0639\u062F\u0627\u062F (\u0628\u0645\u0627 \u0641\u064A \u0630\u0644\u0643 \u0627\u0628\u062A\u0643\u0627\u0631 \u0641\u0631\u0639 \u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0623\u0639\u062F\u0627\u062F \u0627\u0644\u062A\u062D\u0644\u064A\u0644\u064A\u0629)\u060C \u0648\u0641\u064A \u0646\u0638\u0631\u064A\u0629 \u0645\u062A\u0633\u0644\u0633\u0644\u0629 \u0641\u0648\u0631\u064A\u064A\u0647 \u0648\u0645\u0648\u0627\u0636\u064A\u0639 \u0623\u062E\u0631\u0649 \u0641\u064A \u0627\u0644\u062A\u062D\u0644\u064A\u0644 \u0627\u0644\u0631\u064A\u0627\u0636\u064A."@ar . . . "Johann Peter Gustav Lejeune Dirichlet (German: [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0]; 13 February 1805 \u2013 5 May 1859) was a German mathematician who made deep contributions to number theory (including creating the field of analytic number theory), and to the theory of Fourier series and other topics in mathematical analysis; he is credited with being one of the first mathematicians to give the modern formal definition of a function. Although his surname is Lejeune Dirichlet, he is commonly referred to as just Dirichlet, in particular for results named after him."@en . . . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet (13. \u00FAnor 1805 \u2013 5. kv\u011Bten 1859) byl n\u011Bmeck\u00FD matematik. Zasahoval aktivn\u011B do teorie \u010D\u00EDsel, matematick\u00E9 anal\u00FDzy i matematick\u00E9 statistiky. Jeho jm\u00E9nem je nazv\u00E1no , Dirichletova funkce, Dirichlet\u016Fv princip apod."@cs . . "Peter Gustav Lejeune Dirichlet"@en . . . . . "Johann Peter Gustav Lejeune Dirichlet (IPA: [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0]; D\u00FCren, 13 febbraio 1805 \u2013 Gottinga, 5 maggio 1859) \u00E8 stato un matematico tedesco, ricordato soprattutto per la moderna definizione \"formale\" di funzione."@it . . . . . "\u03A0\u03AD\u03C4\u03B5\u03C1 \u0393\u03BA\u03BF\u03CD\u03C3\u03C4\u03B1\u03C6 \u039B\u03B5\u03B6\u03AD\u03BD \u039D\u03C4\u03AF\u03C1\u03B9\u03C7\u03BB\u03B5\u03C4"@el . . "\uC694\uD55C \uD398\uD130 \uAD6C\uC2A4\uD0C0\uD504 \uB974\uC8C8 \uB514\uB9AC\uD074\uB808(\uB3C5\uC77C\uC5B4: Johann Peter Gustav Lejeune Dirichlet, IPA: [\u02C8jo\u02D0han \u02C8\u0261\u028Astaf \u02C8pe\u02D0t\u0250 l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0] \uB610\uB294 \uBC1C\uC74C: [di\u0280i\u02C8\u0283le\u02D0], 1805\uB144 12\uC6D4 31\uC77C \uB4A4\uB80C ~ 1859\uB144 12\uC6D4 30\uC77C \uAD34\uD305\uAC90)\uB294 \uB3C5\uC77C\uC758 \uC218\uD559\uC790\uC774\uB2E4. \uBCA0\uB97C\uB9B0 \uD6D4\uBCFC\uD2B8 \uB300\uD559\uAD50\uC640 \uAD34\uD305\uAC90 \uB300\uD559\uAD50\uC5D0\uC11C \uAC00\uB974\uCCE4\uC73C\uBA70, \uC8FC\uB85C \uD574\uC11D\uD559\uACFC \uC218\uB860 \uBD84\uC57C\uC758 \uC5F0\uAD6C\uB97C \uD588\uB2E4."@ko . . . . . . "Johann Peter Gustav Lejeune Dirichlet ([l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0] oder [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8\u0283le\u02D0]; * 13. Februar 1805 in D\u00FCren; \u2020 5. Mai 1859 in G\u00F6ttingen) war ein deutscher Mathematiker. Dirichlet lehrte in Berlin und G\u00F6ttingen und arbeitete haupts\u00E4chlich auf den Gebieten der Analysis und der Zahlentheorie."@de . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet (ur. 13 lutego 1805 w D\u00FCren, zm. 5 maja 1859 w Getyndze) \u2013 niemiecki matematyk francuskiego pochodzenia."@pl . . "1859-05-05"^^ . . . "\uC694\uD55C \uD398\uD130 \uAD6C\uC2A4\uD0C0\uD504 \uB974\uC8C8 \uB514\uB9AC\uD074\uB808(\uB3C5\uC77C\uC5B4: Johann Peter Gustav Lejeune Dirichlet, IPA: [\u02C8jo\u02D0han \u02C8\u0261\u028Astaf \u02C8pe\u02D0t\u0250 l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0] \uB610\uB294 \uBC1C\uC74C: [di\u0280i\u02C8\u0283le\u02D0], 1805\uB144 12\uC6D4 31\uC77C \uB4A4\uB80C ~ 1859\uB144 12\uC6D4 30\uC77C \uAD34\uD305\uAC90)\uB294 \uB3C5\uC77C\uC758 \uC218\uD559\uC790\uC774\uB2E4. \uBCA0\uB97C\uB9B0 \uD6D4\uBCFC\uD2B8 \uB300\uD559\uAD50\uC640 \uAD34\uD305\uAC90 \uB300\uD559\uAD50\uC5D0\uC11C \uAC00\uB974\uCCE4\uC73C\uBA70, \uC8FC\uB85C \uD574\uC11D\uD559\uACFC \uC218\uB860 \uBD84\uC57C\uC758 \uC5F0\uAD6C\uB97C \uD588\uB2E4."@ko . . . "\u0419\u043E\u0301\u0433\u0430\u043D\u043D \u041F\u0435\u0301\u0442\u0435\u0440 \u0413\u0443\u0301\u0441\u0442\u0430\u0432 \u041B\u0435\u0436\u0435\u043D \u0414\u0456\u0440\u0456\u0445\u043B\u0435\u0301 (\u043D\u0456\u043C. Johann Peter Gustav Lejeune Dirichlet; 13 \u043B\u044E\u0442\u043E\u0433\u043E 1805, \u0414\u044E\u0440\u0435\u043D, \u0424\u0440\u0430\u043D\u0446\u0456\u044F, \u0437\u0430\u0440\u0430\u0437 \u041D\u0456\u043C\u0435\u0447\u0447\u0438\u043D\u0430 \u2014 5 \u0442\u0440\u0430\u0432\u043D\u044F 1859, \u0413\u0435\u0442\u0442\u0456\u043D\u0433\u0435\u043D, \u0413\u0430\u043D\u043D\u043E\u0432\u0435\u0440) \u2014 \u043D\u0456\u043C\u0435\u0446\u044C\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u0432\u0456\u0434\u043E\u043C\u0438\u0439 \u0437\u043D\u0430\u0447\u043D\u0438\u043C \u0432\u043D\u0435\u0441\u043A\u043E\u043C \u0434\u043E \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u0447\u043D\u0438\u0439 \u0430\u043D\u0430\u043B\u0456\u0437, \u0442\u0435\u043E\u0440\u0456\u044E \u0444\u0443\u043D\u043A\u0446\u0456\u0439 \u043A\u043E\u043C\u043F\u043B\u0435\u043A\u0441\u043D\u043E\u0457 \u0437\u043C\u0456\u043D\u043D\u043E\u0457 \u0442\u0430 \u0442\u0435\u043E\u0440\u0456\u044E \u0447\u0438\u0441\u0435\u043B."@uk . . . "\u7D04\u7FF0\u00B7\u5F7C\u5F97\u00B7\u53E4\u65AF\u5854\u592B\u00B7\u52D2\u71B1\u7D0D\u00B7\u72C4\u5229\u514B\u96F7\uFF08Johann Peter Gustav Lejeune Dirichlet\uFF0C\u53D1\u97F3\uFF1A[l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0] \u6216 [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8\u0283le\u02D0]\uFF0C1805\u5E742\u670813\u65E5\uFF0D1859\u5E745\u67085\u65E5\uFF09\uFF0C\u5FB7\u570B\u6578\u5B78\u5BB6\uFF0C\u5275\u7ACB\u4E86\u73FE\u4EE3\u51FD\u6578\u7684\u6B63\u5F0F\u5B9A\u7FA9\u3002\u5176\u5BB6\u5EAD\u4F86\u81EA\u6BD4\u5229\u6642\u7684\u5C0F\u93AE\u91CC\u4EC0\u83B1\u7279\uFF08Richelette\uFF0C\u4ECA\u540D\u4E3A (Richelle) \uFF09\uFF0C\u6B64\u4E43\u5176\u59D3\u6C0F\u201C\u52D2\u71B1\u7D0D\u00B7\u72C4\u5229\u514B\u96F7\u201D\uFF08Lejeune Dirichlet\uFF0C\u6765\u81EA\u6CD5\u8BEDle jeune de Richelette\uFF0C\u610F\u4E3A\u201C\u4F86\u81EA\u91CC\u4EC0\u83B1\u7279\u7684\u5C0F\u4F19\u5B50\u201D\uFF09\u7684\u6765\u6E90\uFF0C\u4ED6\u7684\u7956\u7236\u5C31\u751F\u6D3B\u5728\u90A3\u91CC\u3002"@zh . . . . . . . . "\u30DA\u30FC\u30BF\u30FC\u30FB\u30B0\u30B9\u30BF\u30D5\u30FB\u30C7\u30A3\u30EA\u30AF\u30EC"@ja . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet"@sv . . . . "Johann Peter Gustav Lejeune Dirichlet (IPA: [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0]; D\u00FCren, 13 febbraio 1805 \u2013 Gottinga, 5 maggio 1859) \u00E8 stato un matematico tedesco, ricordato soprattutto per la moderna definizione \"formale\" di funzione."@it . . . . . . . . . . . . . . . . . . "\u7D04\u7FF0\u00B7\u5F7C\u5F97\u00B7\u53E4\u65AF\u5854\u592B\u00B7\u52D2\u71B1\u7D0D\u00B7\u72C4\u5229\u514B\u96F7\uFF08Johann Peter Gustav Lejeune Dirichlet\uFF0C\u53D1\u97F3\uFF1A[l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0] \u6216 [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8\u0283le\u02D0]\uFF0C1805\u5E742\u670813\u65E5\uFF0D1859\u5E745\u67085\u65E5\uFF09\uFF0C\u5FB7\u570B\u6578\u5B78\u5BB6\uFF0C\u5275\u7ACB\u4E86\u73FE\u4EE3\u51FD\u6578\u7684\u6B63\u5F0F\u5B9A\u7FA9\u3002\u5176\u5BB6\u5EAD\u4F86\u81EA\u6BD4\u5229\u6642\u7684\u5C0F\u93AE\u91CC\u4EC0\u83B1\u7279\uFF08Richelette\uFF0C\u4ECA\u540D\u4E3A (Richelle) \uFF09\uFF0C\u6B64\u4E43\u5176\u59D3\u6C0F\u201C\u52D2\u71B1\u7D0D\u00B7\u72C4\u5229\u514B\u96F7\u201D\uFF08Lejeune Dirichlet\uFF0C\u6765\u81EA\u6CD5\u8BEDle jeune de Richelette\uFF0C\u610F\u4E3A\u201C\u4F86\u81EA\u91CC\u4EC0\u83B1\u7279\u7684\u5C0F\u4F19\u5B50\u201D\uFF09\u7684\u6765\u6E90\uFF0C\u4ED6\u7684\u7956\u7236\u5C31\u751F\u6D3B\u5728\u90A3\u91CC\u3002"@zh . "Johann Peter Gustav Lejeune Dirichlet ([l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0] oder [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8\u0283le\u02D0]; * 13. Februar 1805 in D\u00FCren; \u2020 5. Mai 1859 in G\u00F6ttingen) war ein deutscher Mathematiker. Dirichlet lehrte in Berlin und G\u00F6ttingen und arbeitete haupts\u00E4chlich auf den Gebieten der Analysis und der Zahlentheorie."@de . "\u064A\u0648\u0647\u0627\u0646 \u0628\u064A\u062A\u0631 \u063A\u0648\u0633\u062A\u0627\u0641 \u0644\u0648\u062C\u0648\u0646 \u062F\u0631\u0643\u0644\u064A\u0647 (\u0628\u0627\u0644\u0623\u0644\u0645\u0627\u0646\u064A\u0629: Peter Gustav Lejeune Dirichlet) \u0647\u0648 \u0639\u0627\u0644\u0645 \u0631\u064A\u0627\u0636\u064A\u0627\u062A \u0623\u0644\u0645\u0627\u0646\u064A. \u0648\u0644\u062F \u0641\u064A \u0627\u0644\u062B\u0627\u0644\u062B \u0639\u0634\u0631 \u0645\u0646 \u0641\u0628\u0631\u0627\u064A\u0631 \u0639\u0627\u0645 1805 \u0648\u062A\u0648\u0641\u064A \u0641\u064A \u0627\u0644\u062E\u0627\u0645\u0633 \u0645\u0646 \u0645\u0627\u064A \u0639\u0627\u0645 1859 \u0639\u0646 \u0639\u0645\u0631 \u064A\u0646\u0627\u0647\u0632 \u0627\u0644\u0623\u0631\u0628\u0639\u0629 \u0648 \u0627\u0644\u062E\u0645\u0633\u064A\u0646 \u0639\u0627\u0645\u0627. \u0644\u0647 \u0645\u0633\u0627\u0647\u0645\u0627\u062A \u0639\u0645\u064A\u0642\u0629 \u0641\u064A \u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0623\u0639\u062F\u0627\u062F (\u0628\u0645\u0627 \u0641\u064A \u0630\u0644\u0643 \u0627\u0628\u062A\u0643\u0627\u0631 \u0641\u0631\u0639 \u0646\u0638\u0631\u064A\u0629 \u0627\u0644\u0623\u0639\u062F\u0627\u062F \u0627\u0644\u062A\u062D\u0644\u064A\u0644\u064A\u0629)\u060C \u0648\u0641\u064A \u0646\u0638\u0631\u064A\u0629 \u0645\u062A\u0633\u0644\u0633\u0644\u0629 \u0641\u0648\u0631\u064A\u064A\u0647 \u0648\u0645\u0648\u0627\u0636\u064A\u0639 \u0623\u062E\u0631\u0649 \u0641\u064A \u0627\u0644\u062A\u062D\u0644\u064A\u0644 \u0627\u0644\u0631\u064A\u0627\u0636\u064A."@ar . . . . . . "\u0419\u043E\u0433\u0430\u043D\u043D \u041F\u0435\u0442\u0435\u0440 \u0413\u0443\u0441\u0442\u0430\u0432 \u041B\u0435\u0436\u0435\u043D-\u0414\u0456\u0440\u0456\u0445\u043B\u0435"@uk . . "Peter Gustav Lejeune Dirichlet"@en . . . "\u0418\u043E\u0301\u0433\u0430\u043D\u043D \u041F\u0435\u0301\u0442\u0435\u0440 \u0413\u0443\u0301\u0441\u0442\u0430\u0432 \u041B\u0435\u0436\u0451\u043D \u0414\u0438\u0440\u0438\u0445\u043B\u0435\u0301 (\u043D\u0435\u043C. Johann Peter Gustav Lejeune Dirichlet; 13 \u0444\u0435\u0432\u0440\u0430\u043B\u044F 1805, \u0414\u044E\u0440\u0435\u043D, \u0424\u0440\u0430\u043D\u0446\u0443\u0437\u0441\u043A\u0430\u044F \u0438\u043C\u043F\u0435\u0440\u0438\u044F, \u043D\u044B\u043D\u0435 \u0413\u0435\u0440\u043C\u0430\u043D\u0438\u044F \u2014 5 \u043C\u0430\u044F 1859, \u0413\u0451\u0442\u0442\u0438\u043D\u0433\u0435\u043D, \u043A\u043E\u0440\u043E\u043B\u0435\u0432\u0441\u0442\u0432\u043E \u0413\u0430\u043D\u043D\u043E\u0432\u0435\u0440, \u043D\u044B\u043D\u0435 \u0413\u0435\u0440\u043C\u0430\u043D\u0438\u044F) \u2014 \u043D\u0435\u043C\u0435\u0446\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u0432\u043D\u0451\u0441\u0448\u0438\u0439 \u0441\u0443\u0449\u0435\u0441\u0442\u0432\u0435\u043D\u043D\u044B\u0439 \u0432\u043A\u043B\u0430\u0434 \u0432 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u0447\u0435\u0441\u043A\u0438\u0439 \u0430\u043D\u0430\u043B\u0438\u0437, \u0442\u0435\u043E\u0440\u0438\u044E \u0444\u0443\u043D\u043A\u0446\u0438\u0439 \u0438 \u0442\u0435\u043E\u0440\u0438\u044E \u0447\u0438\u0441\u0435\u043B. \u0427\u043B\u0435\u043D \u0411\u0435\u0440\u043B\u0438\u043D\u0441\u043A\u043E\u0439 (1832) \u0438 \u043C\u043D\u043E\u0433\u0438\u0445 \u0434\u0440\u0443\u0433\u0438\u0445 \u0430\u043A\u0430\u0434\u0435\u043C\u0438\u0439 \u043D\u0430\u0443\u043A, \u0432 \u0442\u043E\u043C \u0447\u0438\u0441\u043B\u0435 \u041F\u0435\u0442\u0435\u0440\u0431\u0443\u0440\u0433\u0441\u043A\u043E\u0439 (1837; \u0447\u043B\u0435\u043D-\u043A\u043E\u0440\u0440\u0435\u0441\u043F\u043E\u043D\u0434\u0435\u043D\u0442) \u0438 \u041F\u0430\u0440\u0438\u0436\u0441\u043A\u043E\u0439 (\u0438\u043D\u043E\u0441\u0442\u0440\u0430\u043D\u043D\u044B\u0439 \u0447\u043B\u0435\u043D \u0441 1854; \u043A\u043E\u0440\u0440\u0435\u0441\u043F\u043E\u043D\u0434\u0435\u043D\u0442 \u0441 1833), \u041B\u043E\u043D\u0434\u043E\u043D\u0441\u043A\u043E\u0433\u043E \u043A\u043E\u0440\u043E\u043B\u0435\u0432\u0441\u043A\u043E\u0433\u043E \u043E\u0431\u0449\u0435\u0441\u0442\u0432\u0430 (1855)."@ru . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet fou un matem\u00E0tic alemany. Es va casar amb Rebecka Mendelssohn, provinent d'una distingida fam\u00EDlia de jueus conversos i germana del compositor Felix Mendelssohn. Succe\u00ED Gauss en la c\u00E0tedra de matem\u00E0tiques de la Universitat de G\u00F6ttingen."@ca . . . . "240002"^^ . . . "Peter Gustav Lejeune Dirichlet"@es . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet (D\u00FCren, 13 februari 1805 - G\u00F6ttingen, 5 mei 1859) was een Duitse wiskundige. Hij werkte in G\u00F6ttingen en Berlijn op het gebied van de analyse en de getaltheorie. Dirichlet wordt gezien als degene die de moderne, formele definitie van het wiskundige begrip functie heeft opgesteld. Opmerking: Vaak wordt de voornaam 'Johann' in biografie\u00EBn weggelaten."@nl . . . . . . . "Johann Peter Gustav Lejeune Dirichlet fou un matem\u00E0tic alemany. Es va casar amb Rebecka Mendelssohn, provinent d'una distingida fam\u00EDlia de jueus conversos i germana del compositor Felix Mendelssohn. Succe\u00ED Gauss en la c\u00E0tedra de matem\u00E0tiques de la Universitat de G\u00F6ttingen."@ca . . . . . . . . . . . . . . "Peter Gustav Lejeune Dirichlet"@in . . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet"@en . . . "\u30E8\u30CF\u30F3\u30FB\u30DA\u30FC\u30BF\u30FC\u30FB\u30B0\u30B9\u30BF\u30D5\u30FB\u30EB\u30B8\u30E5\u30FC\u30CC\u30FB\u30C7\u30A3\u30EA\u30AF\u30EC\uFF08Johann Peter Gustav Lejeune Dirichlet, 1805\u5E742\u670813\u65E5 - 1859\u5E745\u67085\u65E5\uFF09\u306F\u3001\u30C9\u30A4\u30C4\u306E\u6570\u5B66\u8005\u3002\u73FE\u4EE3\u7684\u5F62\u5F0F\u306E\u95A2\u6570\u306E\u5B9A\u7FA9\u3092\u4E0E\u3048\u305F\u3053\u3068\u3067\u77E5\u3089\u308C\u3066\u3044\u308B\u3002"@ja . . "Johann Peter Gustav Lejeune Dirichlet (D\u00FCren, 13 februari 1805 - G\u00F6ttingen, 5 mei 1859) was een Duitse wiskundige. Hij werkte in G\u00F6ttingen en Berlijn op het gebied van de analyse en de getaltheorie. Dirichlet wordt gezien als degene die de moderne, formele definitie van het wiskundige begrip functie heeft opgesteld. Opmerking: Vaak wordt de voornaam 'Johann' in biografie\u00EBn weggelaten."@nl . . . . . "Johann Peter Gustav Lejeune Dirichlet"@fr . "Johann Peter Gustav Lejeune Dirichlet (German: [l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0]; 13 February 1805 \u2013 5 May 1859) was a German mathematician who made deep contributions to number theory (including creating the field of analytic number theory), and to the theory of Fourier series and other topics in mathematical analysis; he is credited with being one of the first mathematicians to give the modern formal definition of a function. Although his surname is Lejeune Dirichlet, he is commonly referred to as just Dirichlet, in particular for results named after him."@en . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet (ur. 13 lutego 1805 w D\u00FCren, zm. 5 maja 1859 w Getyndze) \u2013 niemiecki matematyk francuskiego pochodzenia."@pl . "Johann Peter Gustav Lejeune Dirichlet (13 f\u00E9vrier 1805, D\u00FCren \u2013 5 mai 1859, G\u00F6ttingen) est un math\u00E9maticien prussien qui apporta de profondes contributions \u00E0 la th\u00E9orie des nombres, en cr\u00E9ant le domaine de la th\u00E9orie analytique des nombres et \u00E0 la th\u00E9orie des s\u00E9ries de Fourier. On lui doit d'autres avanc\u00E9es en analyse math\u00E9matique. On lui attribue la d\u00E9finition formelle moderne d'une fonction."@fr . . "Johann Peter Gustav Lejeune Dirichlet (l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0 ahoskatua; D\u00FCren, , 1805eko otsailaren 13a - G\u00F6ttingen, 1859ko maiatzaren 5a) alemaniar matematikaria izan zen."@eu . . "Johann Peter Gustav Lejeune Dirichlet (D\u00FCren, 13 de fevereiro de 1805 \u2014 G\u00F6ttingen, 5 de maio de 1859) foi um matem\u00E1tico alem\u00E3o, a quem se atribui a moderna defini\u00E7\u00E3o formal de fun\u00E7\u00E3o. Sua fam\u00EDlia era origin\u00E1ria da cidade de , na B\u00E9lgica, origem de seu apelido \"Lejeune Dirichlet\" (\"o jovem de Richlet\"). Dirichlet nasceu em D\u00FCren, onde seu pai era chefe dos correios. Foi educado na Alemanha e na Fran\u00E7a, onde foi aluno de Simeon Denis Poisson e Jean-Baptiste Joseph Fourier. Sua primeira publica\u00E7\u00E3o foi sobre o \u00DAltimo teorema de Fermat, a famosa conjectura (hoje provada) que afirmava que para , a equa\u00E7\u00E3o n\u00E3o possui solu\u00E7\u00F5es inteiras, com exce\u00E7\u00E3o da solu\u00E7\u00E3o trivial em que , , ou \u00E9 zero, para a qual concebeu uma prova parcial para , que foi completada por Adrien-Marie Legendre, que foi um dos avaliadores. Dirichlet tamb\u00E9m completou sua pr\u00F3pria demonstra\u00E7\u00E3o quase ao mesmo tempo; mais tarde, ele tamb\u00E9m forneceu uma prova completa para o caso de . Os seus contributos mais relevantes para a matem\u00E1tica centrar-se-\u00E3o provavelmente no campo da teoria dos n\u00FAmeros, prestando especial aten\u00E7\u00E3o ao estudo das series, e no desenvolvimento da teoria das s\u00E9ries de Fourier. Aplicou as fun\u00E7\u00F5es anal\u00EDticas ao c\u00E1lculo de problemas aritm\u00E9ticos e estabeleceu crit\u00E9rios de converg\u00EAncia para as s\u00E9ries. No campo da an\u00E1lise matem\u00E1tica aperfei\u00E7oou a defini\u00E7\u00E3o e conceito de fun\u00E7\u00E3o, e em mec\u00E2nica te\u00F3rica centrou-se no estudo do equil\u00EDbrio de sistemas e no conceito de potencial newtoniano. Casou com Rebecka Mendelssohn, origin\u00E1ria de uma distinta fam\u00EDlia, a neta do fil\u00F3sofo Moses Mendelssohn e irm\u00E3 do compositor Felix Mendelssohn. Gotthold Eisenstein, Leopold Kronecker e Rudolf Lipschitz foram seus alunos. Ap\u00F3s a sua morte, os escritos de Dirichlet e outros resultados em teoria dos n\u00FAmeros foram recolhidos, editados e publicados por seu amigo e colega matem\u00E1tico Richard Dedekind sob o t\u00EDtulo Vorlesungen \u00FCber Zahlentheorie (Aulas sobre Teoria dos N\u00FAmeros). Foi eleito membro da Academia de Ci\u00EAncias da Baviera. Esta sepultado no em G\u00F6ttingen."@pt . . "1827"^^ . . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet"@ca . . . . "Johann Peter Gustav Lejeune Dirichlet (l\u0259\u02C8\u0292\u0153n di\u0280i\u02C8kle\u02D0 ahoskatua; D\u00FCren, , 1805eko otsailaren 13a - G\u00F6ttingen, 1859ko maiatzaren 5a) alemaniar matematikaria izan zen."@eu . "30238"^^ . . . . . . . . . . . . . "\u064A\u0648\u0647\u0627\u0646 \u0628\u064A\u062A\u0631 \u063A\u0648\u0633\u062A\u0627\u0641 \u0644\u0648\u062C\u0648\u0646 \u062F\u0631\u0643\u0644\u064A\u0647"@ar . . "1805-02-13"^^ . . . . . . . "Johann Peter Gustav Lejeune Dirichlet, f\u00F6dd 13 februari 1805 i D\u00FCren, d\u00F6d 5 maj 1859 i G\u00F6ttingen, var en tysk matematiker som tillskrivits definitionen av det moderna, allm\u00E4nna funktionsbegreppet. Dirichlet och hans sl\u00E4kt h\u00E4rstammade fr\u00E5n i Belgien vilket givit honom hans namn \"le jeune de Richelet\", det vill s\u00E4ga \"den unge fr\u00E5n Richelet\". Dirichlet f\u00F6ddes i D\u00FCren d\u00E4r hans far var postm\u00E4stare. Han var gift med , barnbarn till filosofen Moses Mendelssohn och syster till komposit\u00F6ren Felix Mendelssohn-Bartholdy. Dirichlet blev 1839 professor i matematik i Berlin och 1855 i G\u00F6ttingen. Han studerade en l\u00E4ngre tid i Paris, d\u00E4r Fourier v\u00E4ckte hans intresse f\u00F6r den matematiska fysikens metoder, inom vilket omr\u00E5de Dirichlet gjort insatser av stort v\u00E4rde, till en del best\u00E5ende d\u00E4ri, att han klarare \u00E4n sina f\u00F6reg\u00E5ngare best\u00E4mde villkoren, f\u00F6r metodernas giltighet. Han var \u00E4ven den f\u00F6rsta som angav l\u00F6sningen till problemet om en sf\u00E4rs r\u00F6relse i en v\u00E4tska. Det omr\u00E5de, d\u00E4r Dirichlets verksamhet varit av st\u00F6rsta betydelse, \u00E4r dock talteori, d\u00E4r han kan s\u00E4gas vara den f\u00F6rste, som till\u00E4mpat analysen p\u00E5 talteorin och d\u00E4rigenom funnit dittills oanade samband mellan skilda grenar av matematiken. Hans f\u00F6rsta avhandling handlade om Fermats sista sats f\u00F6r vilken han producerade ett delbevis f\u00F6r fallet n = 5 och beviset f\u00F6r n = 14. Dirichlets nya metoder inom talteori har i avseende p\u00E5 epokg\u00F6rande betydelse j\u00E4mf\u00F6rts med Ren\u00E9 Descartes analytiska geometri. Bland Dirichlets betydande arbeten kan vidare n\u00E4mnas beviset f\u00F6r f\u00F6rekomsten av o\u00E4ndligt m\u00E5nga primtal i varje aritmetisk f\u00F6ljd, vars termer inte inneh\u00E5ller n\u00E5gon gemensam faktor, samt best\u00E4mningen av antalet klasser av kvadratiska former. Dirichlet invaldes 1854 som utl\u00E4ndsk ledamot av Kungliga Vetenskapsakademien och 1855 som utl\u00E4ndsk ledamot av Royal Society. Efter Dirichlets d\u00F6d publicerades han f\u00F6rel\u00E4sningar och verk inom talteori av v\u00E4nnen och kollegan Richard Dedekind i Vorlesungen \u00FCber Zahlentheorie."@sv . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet"@pt . . . . . . "Peter Gustav Lejeune Dirichlet"@it . . "Johann Peter Gustav Lejeune Dirichlet (D\u00FCren, actual Alemania, 13 de febrero de 1805 - Gotinga, actual Alemania, 5 de mayo de 1859) fue un matem\u00E1tico alem\u00E1n al que se le atribuye la definici\u00F3n \"formal\" moderna de una funci\u00F3n. Fue educado en Alemania, y despu\u00E9s en Francia, donde aprendi\u00F3 de muchos de los m\u00E1s renombrados matem\u00E1ticos del tiempo, relacion\u00E1ndose con algunos como Fourier. Sus m\u00E9todos proporcionaron una perspectiva completamente nueva y sus resultados se encuentran entre los m\u00E1s importantes de las matem\u00E1ticas. Hoy en d\u00EDa sus t\u00E9cnicas est\u00E1n m\u00E1s en auge que nunca. \"... Dirichlet cre\u00F3 una parte nueva en las matem\u00E1ticas, la aplicaci\u00F3n de las series infinitas que Fourier ha introducido en la teor\u00EDa del calor en la exploraci\u00F3n de las propiedades de los n\u00FAmeros primos. \u00C9l ha descubierto una variedad de teoremas que ... son los pilares de las nuevas teor\u00EDas\". C. G. J. Jacobi el 21 de diciembre de 1846 en una carta a Alexander von Humboldt"@es . . . "\u0418\u043E\u0301\u0433\u0430\u043D\u043D \u041F\u0435\u0301\u0442\u0435\u0440 \u0413\u0443\u0301\u0441\u0442\u0430\u0432 \u041B\u0435\u0436\u0451\u043D \u0414\u0438\u0440\u0438\u0445\u043B\u0435\u0301 (\u043D\u0435\u043C. Johann Peter Gustav Lejeune Dirichlet; 13 \u0444\u0435\u0432\u0440\u0430\u043B\u044F 1805, \u0414\u044E\u0440\u0435\u043D, \u0424\u0440\u0430\u043D\u0446\u0443\u0437\u0441\u043A\u0430\u044F \u0438\u043C\u043F\u0435\u0440\u0438\u044F, \u043D\u044B\u043D\u0435 \u0413\u0435\u0440\u043C\u0430\u043D\u0438\u044F \u2014 5 \u043C\u0430\u044F 1859, \u0413\u0451\u0442\u0442\u0438\u043D\u0433\u0435\u043D, \u043A\u043E\u0440\u043E\u043B\u0435\u0432\u0441\u0442\u0432\u043E \u0413\u0430\u043D\u043D\u043E\u0432\u0435\u0440, \u043D\u044B\u043D\u0435 \u0413\u0435\u0440\u043C\u0430\u043D\u0438\u044F) \u2014 \u043D\u0435\u043C\u0435\u0446\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u0432\u043D\u0451\u0441\u0448\u0438\u0439 \u0441\u0443\u0449\u0435\u0441\u0442\u0432\u0435\u043D\u043D\u044B\u0439 \u0432\u043A\u043B\u0430\u0434 \u0432 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u0447\u0435\u0441\u043A\u0438\u0439 \u0430\u043D\u0430\u043B\u0438\u0437, \u0442\u0435\u043E\u0440\u0438\u044E \u0444\u0443\u043D\u043A\u0446\u0438\u0439 \u0438 \u0442\u0435\u043E\u0440\u0438\u044E \u0447\u0438\u0441\u0435\u043B. \u0427\u043B\u0435\u043D \u0411\u0435\u0440\u043B\u0438\u043D\u0441\u043A\u043E\u0439 (1832) \u0438 \u043C\u043D\u043E\u0433\u0438\u0445 \u0434\u0440\u0443\u0433\u0438\u0445 \u0430\u043A\u0430\u0434\u0435\u043C\u0438\u0439 \u043D\u0430\u0443\u043A, \u0432 \u0442\u043E\u043C \u0447\u0438\u0441\u043B\u0435 \u041F\u0435\u0442\u0435\u0440\u0431\u0443\u0440\u0433\u0441\u043A\u043E\u0439 (1837; \u0447\u043B\u0435\u043D-\u043A\u043E\u0440\u0440\u0435\u0441\u043F\u043E\u043D\u0434\u0435\u043D\u0442) \u0438 \u041F\u0430\u0440\u0438\u0436\u0441\u043A\u043E\u0439 (\u0438\u043D\u043E\u0441\u0442\u0440\u0430\u043D\u043D\u044B\u0439 \u0447\u043B\u0435\u043D \u0441 1854; \u043A\u043E\u0440\u0440\u0435\u0441\u043F\u043E\u043D\u0434\u0435\u043D\u0442 \u0441 1833), \u041B\u043E\u043D\u0434\u043E\u043D\u0441\u043A\u043E\u0433\u043E \u043A\u043E\u0440\u043E\u043B\u0435\u0432\u0441\u043A\u043E\u0433\u043E \u043E\u0431\u0449\u0435\u0441\u0442\u0432\u0430 (1855)."@ru . . . "Johann Peter Gustav Lejeune Dirichlet (13 Februari 1805 \u2013 5 Mei 1859) ialah matematikawan Jerman yang dihargai karena definisi \"formal\" modern dari fungsi. Keluarganya berasal dari kota di Belgia, dari yang nama belakangnya \"Lejeune Dirichlet\" (\"le jeune de Richelet\" = \"anak muda dari Richelet\") diturunkan, dan di mana kakeknya tinggal. Dirichlet lahir di D\u00FCren, di mana ayahnya merupakan kepala kantor pos. Ia mendapatkan pendidikan di Jerman, dan kemudian Prancis, di mana ia belajar dari banyak matematikawan terkemuka saat itu. Karya pertamanya ialah pada teorema akhir Fermat. Inilah konjektur terkenal (kini terbukti) yang menyatakan bahwa untuk n > 2, persamaan xn + yn = zn tak memiliki solusi bilangan bulat, selain daripada yang trivial yang mana x, y, atau z itu 0. Ia membuat bukti parsial untuk kasus n = 5, yang dilengkapi oleh Adrien-Marie Legendre, yang merupakan salah satu wasit. Dirichlet juga melengkapi pembuktiannya sendiri hampir di saat yang sama; kemudian ia juga menciptakan bukti penuh untuk kasus n = 14. Ia menikahi , yang berasal dari keluarga Yahudi berpengaruh, menjadi cucu filsuf Moses Mendelssohn, dan saudari komponis Felix Mendelssohn. , Leopold Kronecker, dan ialah muridnya. Setelah kematiannya, ceramah Dirichlet dan hasil lain dalam teori bilangan dikumpulkan, disunting dan diterbitkan oleh kawannya dan matematikawan Richard Dedekind dengan judul (Ceramah pada Teori Bilangan)."@in . . . . "Johann Peter Gustav Lejeune Dirichlet (D\u00FCren, 13 de fevereiro de 1805 \u2014 G\u00F6ttingen, 5 de maio de 1859) foi um matem\u00E1tico alem\u00E3o, a quem se atribui a moderna defini\u00E7\u00E3o formal de fun\u00E7\u00E3o. Sua fam\u00EDlia era origin\u00E1ria da cidade de , na B\u00E9lgica, origem de seu apelido \"Lejeune Dirichlet\" (\"o jovem de Richlet\"). Casou com Rebecka Mendelssohn, origin\u00E1ria de uma distinta fam\u00EDlia, a neta do fil\u00F3sofo Moses Mendelssohn e irm\u00E3 do compositor Felix Mendelssohn. Foi eleito membro da Academia de Ci\u00EAncias da Baviera. Esta sepultado no em G\u00F6ttingen."@pt . . . . . . . . . . . . "250"^^ . . . . . . . . . . "\u30E8\u30CF\u30F3\u30FB\u30DA\u30FC\u30BF\u30FC\u30FB\u30B0\u30B9\u30BF\u30D5\u30FB\u30EB\u30B8\u30E5\u30FC\u30CC\u30FB\u30C7\u30A3\u30EA\u30AF\u30EC\uFF08Johann Peter Gustav Lejeune Dirichlet, 1805\u5E742\u670813\u65E5 - 1859\u5E745\u67085\u65E5\uFF09\u306F\u3001\u30C9\u30A4\u30C4\u306E\u6570\u5B66\u8005\u3002\u73FE\u4EE3\u7684\u5F62\u5F0F\u306E\u95A2\u6570\u306E\u5B9A\u7FA9\u3092\u4E0E\u3048\u305F\u3053\u3068\u3067\u77E5\u3089\u308C\u3066\u3044\u308B\u3002"@ja . "Peter Gustav Lejeune Dirichlet"@eu . . . . "Peter Gustav Lejeune Dirichlet"@pl . "Johann Peter Gustav Lejeune Dirichlet"@en . . . . "\uD398\uD130 \uAD6C\uC2A4\uD0C0\uD504 \uB974\uC8C8 \uB514\uB9AC\uD074\uB808"@ko . . . . . . . . . . . . . . . "Peter Gustav Lejeune Dirichlet"@en . . . . . . "Johann Dirichlet"@nl . "Johann Peter Gustav Lejeune Dirichlet"@cs . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . "Johann Peter Gustav Lejeune Dirichlet (D\u00FCren, actual Alemania, 13 de febrero de 1805 - Gotinga, actual Alemania, 5 de mayo de 1859) fue un matem\u00E1tico alem\u00E1n al que se le atribuye la definici\u00F3n \"formal\" moderna de una funci\u00F3n. Fue educado en Alemania, y despu\u00E9s en Francia, donde aprendi\u00F3 de muchos de los m\u00E1s renombrados matem\u00E1ticos del tiempo, relacion\u00E1ndose con algunos como Fourier. Sus m\u00E9todos proporcionaron una perspectiva completamente nueva y sus resultados se encuentran entre los m\u00E1s importantes de las matem\u00E1ticas. Hoy en d\u00EDa sus t\u00E9cnicas est\u00E1n m\u00E1s en auge que nunca."@es . . . . .