000 | 01012nam a2200205 4500 | ||
---|---|---|---|
008 | 160616s2000 000 0 | ||
020 | _a9789810235291 (PB) | ||
041 | _aeng | ||
080 |
_a512.81 _bHSI |
||
100 | _aHsiang W. Y | ||
245 | _aLectures on lie groups | ||
260 |
_bWorld scientific _aSingapore _c2000 |
||
300 | _av, 108 p | ||
490 |
_aSeries on university mathematics _v2 |
||
505 | _aLinear groups and linear representations; Lie groups and Lie algebras; orbital geometry of the adjoint action; coxeter groups, Weyl reduction and Weyl formulas; structural theory of compact Lie algebras and compact connected Lie groups. | ||
520 | _aAn introduction to the theory of compact connected Lie groups and their representations, and a presentation of the structure and classification theory. It uses a non-traditional approach and organization. There is a balance between the algebraic and geometric aspects of Lie theory. | ||
650 | _aLie groups | ||
690 | _aMathematics | ||
942 | _cBK | ||
999 |
_c27546 _d27546 |