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The Based Ring of the Lowest Two-Sided Cell of an Affine Weyl Group, III
Xi, Nanhua1,2
2016-12-01
Source PublicationALGEBRAS AND REPRESENTATION THEORY
ISSN1386-923X
Volume19Issue:6Pages:1467-1475
AbstractWe show that Lusztig's homomorphism from an affine Hecke algebra to the direct summand of its asymptotic Hecke algebra corresponding to the lowest two-sided cell is related to the homomorphism constructed by Chriss and Ginzburg using equivariant K-theory by a matrix over the representation ring of the associated algebraic group.
KeywordKazhdan-Lusztig cell Based ring Affine Weyl group
DOI10.1007/s10468-016-9627-2
Language英语
Funding ProjectNatural Sciences Foundation of China[11321101]
WOS Research AreaMathematics
WOS SubjectMathematics
WOS IDWOS:000388252300010
PublisherSPRINGER
Citation statistics
Cited Times:1[WOS]   [WOS Record]     [Related Records in WOS]
Document Type期刊论文
Identifierhttp://ir.amss.ac.cn/handle/2S8OKBNM/24169
Collection数学所
Affiliation1.Chinese Acad Sci, Inst Math, Beijing 100190, Peoples R China
2.Univ Chinese Acad Sci, Sch Math Sci, Beijing 100049, Peoples R China
Recommended Citation
GB/T 7714
Xi, Nanhua. The Based Ring of the Lowest Two-Sided Cell of an Affine Weyl Group, III[J]. ALGEBRAS AND REPRESENTATION THEORY,2016,19(6):1467-1475.
APA Xi, Nanhua.(2016).The Based Ring of the Lowest Two-Sided Cell of an Affine Weyl Group, III.ALGEBRAS AND REPRESENTATION THEORY,19(6),1467-1475.
MLA Xi, Nanhua."The Based Ring of the Lowest Two-Sided Cell of an Affine Weyl Group, III".ALGEBRAS AND REPRESENTATION THEORY 19.6(2016):1467-1475.
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