Meaning of NOETHER, (AMALIE) EMMY in English

NOETHER, (AMALIE) EMMY

born March 23, 1882, Erlangen, Ger. died April 14, 1935, Bryn Mawr, Pa., U.S. German mathematician whose innovations in higher algebra gained her recognition as the most creative abstract algebraist of modern times. Noether received the Ph.D. degree from the University of Erlangen in 1907, with a dissertation on algebraic invariants. From 1913 she lectured occasionally at Erlangen, substituting for her father, Max Noether (18441921). In 1915 she went to the University of Gttingen and was persuaded by the eminent mathematicians David Hilbert and Felix Klein to remain there over the objections of some faculty members; she won formal admission as an academic lecturer in 1919. The appearance of Moduln in nichtkommutativen Bereichen, insbesondere aus Differential- und Differenzen-Ausdrcken (1920; Concerning Moduli in Noncommutative Fields, Particularly in Differential and Difference Terms), written in collaboration with a Gttingen colleague, Werner Schmeidler, and published in Mathematische Zeitschrift, marked the first notice of Noether as an extraordinary mathematician. For the next six years her investigations centred on the general theory of ideals (special subsets of rings), for which her residual theorem is an important part. On an axiomatic basis she developed a general theory of ideals for all cases. Her abstract theory helped draw together many important mathematical developments. From 1927 Noether concentrated on noncommutative algebras (algebras in which the order in which numbers are multiplied affects the answer), their linear transformations, and their application to commutative number fields. She built up the theory of noncommutative algebras in a newly unified and purely conceptual way. In collaboration with Helmut Hasse and Richard Brauer, she investigated the structure of noncommutative algebras and their application to commutative fields by means of cross product (a form of multiplication used between two vectors). Important papers from this period are Hyperkomplexe Grssen und Darstellungstheorie (1929; Hypercomplex Number Systems and Their Representation) and Nichtkommutative Algebra (1933; Noncommutative Algebra). In addition to research and teaching, Noether helped edit the Mathematische Annalen. From 1930 to 1933 she was the centre of the strongest mathematical activity at Gttingen. The extent and significance of her work cannot be accurately judged from her papers. Much of her work appeared in the publications of students and colleagues; many times a suggestion or even a casual remark revealed her great insight and stimulated another to complete and perfect some idea. When the Nazis came to power in Germany in 1933, Noether and many other Jewish professors at Gttingen were dismissed. In October she left for the United States to become visiting professor of mathematics at Bryn Mawr College and to lecture and conduct research at the Institute for Advanced Study, Princeton, N.J.

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