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Genealogie V Chrstn. Ferd., Pfarrer, S d. Kaufm. u. Senators Anton Chrstn. Ludw. in Jüterbog; M Christiane Elis., T d. Tuchmachermeisters Joh. Gg. Friedrich in Calbe ...
Ferdinand Georg Frobenius 1849-1917. Georg Frobenius briefly attended the University of Göttingen, but he only studied there for one semester before returning to the city of his birth, Berlin. At the University of Berlin he attended lectures by Kronecker, Kummer and Weierstrass. He continued to study there for his doctorate, attending the ...
Ferdinand Georg Frobenius was born in 1849 and spent his early career at the University of Berlin. From 1874 to 1892 he worked in Zurich at the institution now known as ETH. In 1892 he returned to the University of Berlin, working there until his death in 1917. He made fundamental contributions to many areas of mathematics, being most famous for founding the theory of representations of finite ...
Ferdinand Georg Frobenius (26 Oktober 1849 – 3 Agustus 1917) adalah seorang matematikawan Jerman. Ia dikenal atas jasanya dalam teori fungsi eliptik, persamaan diferensial, teori bilangan dan teori grup. Publikasi. Frobenius, Ferdinand Georg (1968), Serre, J.-P., ed., Gesammelte Abhandlungen.
Frobenius conjecture. Frobenius–Schur indicator. Perron–Frobenius theorem. Quadratic Frobenius test. Rouché–Frobenius theorem. Quasi-Frobenius Lie algebra. Quasi-Frobenius ring. Category: Lists of things named after mathematicians.
Die Gesammelten Abhandlungen von Ferdinand Georg Frobenius erscheinen in drei Bänden. Band I enthält in chronologischer Abfolge seine Veröffentlichungen von 1870 bis 1880, Band II jene von 1880 bis 1896, und Band III die Artikel von 1896 bis 1917. Band I beginnt mit Frobenius' in lateinischer Sprache verfasste Dissertation und beinhaltet weitere 20 Publikationen.
Frobenius matrices are named after Ferdinand Georg Frobenius. The term Frobenius matrix may also be used for an alternative matrix form that differs from an Identity matrix only in the elements of a single row preceding the diagonal entry of that row (as opposed to the above definition which has the matrix differing from the identity matrix in a single column below the diagonal).
