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Sayfa 119
1 , Pages 119 - 135 S 1061 - 0022 ( 06 ) 00895 - 8 Article electronically
published on January 19 , 2006 CAYLEY - HAMILTON THEOREM FOR
QUANTUM MATRIX ALGEBRAS OF GL ( mn ) TYPE D . I . GUREVICH , P . N .
PYATOV , AND P ...
1 , Pages 119 - 135 S 1061 - 0022 ( 06 ) 00895 - 8 Article electronically
published on January 19 , 2006 CAYLEY - HAMILTON THEOREM FOR
QUANTUM MATRIX ALGEBRAS OF GL ( mn ) TYPE D . I . GUREVICH , P . N .
PYATOV , AND P ...
Sayfa 134
Let M be the matrix of generators of a quantum matrix algebra M ( R , F ) of Hecke
type . Then the - powers of M corresponding to the rectangular Young diagrams I
= ( ( r + 1 ) * + 1 ) , r , s = 0 , 1 , . . . , are expressed in terms of its kth powers as ...
Let M be the matrix of generators of a quantum matrix algebra M ( R , F ) of Hecke
type . Then the - powers of M corresponding to the rectangular Young diagrams I
= ( ( r + 1 ) * + 1 ) , r , s = 0 , 1 , . . . , are expressed in terms of its kth powers as ...
Sayfa 134
Let M be the matrix of generators of a quantum matrix algebra M(R, F) of Hecke
type. Then the X-powers of M corresponding to the rectangular Young diagrams
X = ((r + l)s+1), r,s = 0, 1, ... , are expressed in terms of its kth powers as follows: io
...
Let M be the matrix of generators of a quantum matrix algebra M(R, F) of Hecke
type. Then the X-powers of M corresponding to the rectangular Young diagrams
X = ((r + l)s+1), r,s = 0, 1, ... , are expressed in terms of its kth powers as follows: io
...
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İçindekiler
A Antipov and A I Generalov The Yoneda algebras of symmetric special | 377 |
A G Bytsko On higher spin U sl2invariant Rmatrices | 393 |
Dirac operator | 409 |
Telif Hakkı | |
6 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
algebraic analytic apply approximation arbitrary argument assume asymptotic bounded called closed coefficients coincides complete condition connected Consequently consider consists constant construction contains continuous corresponding curves defined definition denote depend determined differential dimension discrete edges element equal equation equivalent estimate example exists fact finite fixed formula function given Goursat problem graph hyperbolic identity implies inequality integral introduce invariant lattice Lemma limit linear locally Math Mathematical matrix functions means measure metric Moreover Note obtain operator parameter particular periodic points polynomial positive potential problem Proof proof of Theorem Proposition prove quantum rational reduced regular relation Remark respectively result satisfies sequence side singular solution space spectrum statement Subsection sufficiently Suppose Theorem theory transformation unique values vector vertices zero