000			02011nam a2200361Ki 4500
001			ocn827279427
003			OCoLC
005			20240726105336.0
008			130212s2013 enk ob 001 0 eng d
040			_aNT _beng _erda _cNT
020			_a9781107314443 _q((electronic)l(electronic)ctronic)l((electronic)l(electronic)ctronic)ctronic bk.
050	0	4	_aQA252 _b.C663 2013
049			_aNTA
100	1		_aGreen, R. M., _d1971- _e1
245	1	0	_aCombinatorics of minuscule representationsR.M. Green, University of Colorado, Denver.
260			_aCambridge : _bCambridge University Press, _c(c)2013.
300			_a1 online resource.
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
347			_adata file _2rda
490	1		_aCambridge tracts in mathematics
520	0		_a"Highest weight modules play a key role in the representation theory of several classes of algebraic objects occurring in Lie theory, including Lie algebras, Lie groups, algebraic groups, Chevalley groups and quantized enveloping algebras. In many of the most important situations, the weights may be regarded as points in Euclidean space, and there is a finite group (called a Weyl group) that acts on the set of weights by linear transformations. The minuscule representations are those for which the Weyl group acts transitively on the weights, and the highest weight of such a representation is called a minuscule weight"-- _cProvided by publisher.
504			_a2
530			_a2 _ub
650		0	_aRepresentations of Lie algebras.
650		0	_aCombinatorial analysis.
655		1	_aElectronic Books.
856	4	0	_uhttps://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&db=nlabk&AN=529645&site=eds-live&custid=s3260518 _zClick to access digital title | log in using your CIU ID number and my.ciu.edu password
942			_cOB _D _eEB _hQA. _m2013 _QOL _R _x _8NFIC _2LOC
994			_a02 _bNT
999			_c97173 _d97173
902			_a1 _bCynthia Snell _c1 _dCynthia Snell