000 02322nam a22004455i 4500
001 978-3-540-35711-7
003 DE-He213
005 20190213151346.0
007 cr nn 008mamaa
008 121227s1978 gw | s |||| 0|eng d
020 _a9783540357117
_9978-3-540-35711-7
024 7 _a10.1007/BFb0067708
_2doi
050 4 _aQA1-939
072 7 _aPB
_2bicssc
072 7 _aMAT000000
_2bisacsh
072 7 _aPB
_2thema
082 0 4 _a510
_223
100 1 _aJames, G. D.
_eauthor.
_4aut
_4http://id.loc.gov/vocabulary/relators/aut
245 1 4 _aThe Representation Theory of the Symmetric Groups
_h[electronic resource] /
_cby G. D. James.
264 1 _aBerlin, Heidelberg :
_bSpringer Berlin Heidelberg :
_bImprint: Springer,
_c1978.
300 _aVIII, 160 p.
_bonline resource.
336 _atext
_btxt
_2rdacontent
337 _acomputer
_bc
_2rdamedia
338 _aonline resource
_bcr
_2rdacarrier
347 _atext file
_bPDF
_2rda
490 1 _aLecture Notes in Mathematics,
_x0075-8434 ;
_v682
505 0 _aBackground from representation theory -- The symmetric group -- Diagrams, tableaux and tabloids -- Specht modules -- Examples -- The character table of -- The garnir relations -- The standard basis of the specht module -- The branching theorem -- p-regular partitions -- The irreducible representations of -- Composition factors -- Semistandard homomorphisms -- Young’s rule -- Sequences -- The Littlewood-richardson rule -- A specht series for M? -- Hooks and skew-hooks -- The determinantal form -- The hook formula for dimensions -- The murnaghan-nakayama rule -- Binomial coefficients -- Some irreducible specht modules -- On the decomposition matrices of -- Young’s orthogonal form -- Representations of the general linear group.
650 0 _aMathematics.
650 1 4 _aMathematics, general.
_0http://scigraph.springernature.com/things/product-market-codes/M00009
710 2 _aSpringerLink (Online service)
773 0 _tSpringer eBooks
776 0 8 _iPrinted edition:
_z9783662167625
776 0 8 _iPrinted edition:
_z9783540089483
830 0 _aLecture Notes in Mathematics,
_x0075-8434 ;
_v682
856 4 0 _uhttps://doi.org/10.1007/BFb0067708
912 _aZDB-2-SMA
912 _aZDB-2-LNM
912 _aZDB-2-BAE
999 _c10398
_d10398