"History of Lie theory"의 두 판 사이의 차이

2013년 12월 6일 (금) 07:59 판

Sophus Lie—the precursor of the modern theory of Lie groups.
Wilhelm Killing, who discovered almost all central concepts and theorems on the structure and classification of semisimple Lie algebras.
Élie Cartan and is primarily concerned with developments that would now be interpreted as representations of Lie algebras, particularly simple and semisimple algebras.
Hermann Weyl the development of representation theory of Lie groups and algebras.

http://mathoverflow.net/questions/87627/fraktur-symbols-for-lie-algebras-mathfrakg-etc
The point is that group theory and Lie groups in particular were actively developed by German mathematicians in the nineteenth century; they were not inventing exotic notation when they used these particular letters as symbols

Elie Cartan Sur la structure des groupes de transformations finis et continus Cartan's famous 1894 thesis, cleaning up Killing's work on the classification Lie algebras.
Wilhelm Killing, "Die Zusammensetzung der stetigen endlichen Transformations-gruppen" 1888-1890 part 1 part 2 part 3 part 4 Killing's classification of simple Lie complex Lie algebras.
S. Lie, F. Engel "Theorie der transformationsgruppen" 1888 Volume 1 Volume 2 Volume 3 Lie's monumental summary of his work on Lie groups and algebras.
Hermann Weyl, Theorie der Darstellung kontinuierlicher halb-einfacher Gruppen durch lineare Transformationen. 1925-1926 I, II, III. Weyl's paper on the representations of compact Lie groups, giving the Weyl character formula.
H. Weyl The classical groups ISBN 978-0-691-05756-9 A classic, describing the representation theory of lie groups and its relation to invariant theory
Chevalley, On certain simple groups

J.-P. Serre, Lie algebras and Lie groups ISBN 978-3540550082 Covers most of the basic theory of Lie algebras.
J.-P. Serre, Complex semisimple Lie algebras ISBN 978-3-540-67827-4 Covers the classification and representation theory of complex Lie algebras.
N. Jacobson, Lie algebras ISBN 978-0486638324 A good reference for all proofs about finite dimensional Lie algebras
Claudio Procesi, Lie Groups: An Approach through Invariants and Representations, ISBN 978-0387260402. Similar to the course, with more emphasis on invariant theory.

Varadarajan, Historical review of Lie Theory
- http://www.math.ucla.edu/~vsv/liegroups2007/liegroups2007.html
Hawkins, Thomas. 1998. “From General Relativity to Group Representations: The Background to Weyl’s Papers of 1925–26.” In Matériaux Pour L’histoire Des Mathématiques Au XX\rm E$ Siècle (Nice, 1996), 3:69–100. Sémin. Congr. Paris: Soc. Math. France. http://www.ams.org/mathscinet-getitem?mr=1640256. http://www.emis.de/journals/SC/1998/3/pdf/smf_sem-cong_3_69-100.pdf
T. Hawkins Emergence of the theory of Lie groups ISBN 978-0-387-98963-1 Covers the early history of the work by Lie, Killing, Cartan and Weyl, from 1868 to 1926.
A. Borel Essays in the history of Lie groups and algebraic groups ISBN 978-0-8218-0288-5 Covers the history.
"From Galois and Lie to Tits Buildings", The Coxeter Legacy: Reflections and Projections (ed. C. Davis and E.W. Ellers), Fields Inst. Publications volume 48, American Math. Soc. (2006), 45–62.
- http://books.google.com/books?id=cKpBGcqpspIC&printsec=frontcover&source=gbs_ge_summary_r&cad=0#v=twopage&q=chevalley&f=false
- http://www.fields.utoronto.ca/programs/scientific/03-04/coxeterlegacy/abstracts.html

@@ 32번째 줄: / 32번째 줄: @@
 ==리 타입의 유한군==
-* 딕슨
+* [[Finite groups of Lie type]]
-* Tits 기하학적 접근
-* Chevalley 대수적 접근
-* [[Chevalley integral form]]
@@ 82번째 줄: / 78번째 줄: @@
 ** http://books.google.com/books?id=cKpBGcqpspIC&printsec=frontcover&source=gbs_ge_summary_r&cad=0#v=twopage&q=chevalley&f=false
 ** http://www.fields.utoronto.ca/programs/scientific/03-04/coxeterlegacy/abstracts.html
 [[분류:math and physics]]
 [[분류:Lie theory]]