Kitabın içinden
35 sonuçtan 1-3 arası sonuçlar
Sayfa 26
By the definition of the matrix QB ( see Subsection 1.3 ) , we obtain Q [ B ] = Q [ B '
] or Q [ B ( B ' ) - 1 ) = Q for the above matrices B , B ' e SLn ( Z ) . Hence we
conclude that y = B ( B ' ) - 1 belongs to the proper orthogonal group 0+ ( Q ) of
the ...
By the definition of the matrix QB ( see Subsection 1.3 ) , we obtain Q [ B ] = Q [ B '
] or Q [ B ( B ' ) - 1 ) = Q for the above matrices B , B ' e SLn ( Z ) . Hence we
conclude that y = B ( B ' ) - 1 belongs to the proper orthogonal group 0+ ( Q ) of
the ...
Sayfa 27
If the matrix Q ( C ) = ( 4 % ) belongs to the class { Q } + , then Q ( C ) = Q [ B ] =
QB for some matrix B = ( b * ) E SLn ( Z ) , and aQb [ MC ] = aQ ( C ) ( Mc ) = ( ( CA
G + + ( 9.4 , G ) + ( C ) CA ( Q ) Hence , the matrix b is primitive , it belongs to the ...
If the matrix Q ( C ) = ( 4 % ) belongs to the class { Q } + , then Q ( C ) = Q [ B ] =
QB for some matrix B = ( b * ) E SLn ( Z ) , and aQb [ MC ] = aQ ( C ) ( Mc ) = ( ( CA
G + + ( 9.4 , G ) + ( C ) CA ( Q ) Hence , the matrix b is primitive , it belongs to the ...
Sayfa 318
Then the mapping R + 3 a Ha ( T1T1 ( a ) T1 – T2T2 ( a ) T % ) E S. belongs to the
class Sp . Proof . The singular numbers of T and T * coincide . Therefore , the
conditions of type TEEO , TE SP , etc. , are invariant under conjugation .
Moreover ...
Then the mapping R + 3 a Ha ( T1T1 ( a ) T1 – T2T2 ( a ) T % ) E S. belongs to the
class Sp . Proof . The singular numbers of T and T * coincide . Therefore , the
conditions of type TEEO , TE SP , etc. , are invariant under conjugation .
Moreover ...
Kullanıcılar ne diyor? - Eleştiri yazın
Her zamanki yerlerde hiçbir eleştiri bulamadık.
İçindekiler
REPRESENTATION OF A FORM | 17 |
10 The automorphism groups of discriminant forms | 59 |
12 A general formula for the weight of representations | 65 |
Telif Hakkı | |
5 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
apply arbitrary assume assumptions asymptotics bases basis belongs boundary bounded classical coefficients coincides compact complex condition Consequently consider constant construction contains continuous convex corresponding curve decomposition defined definition denote depends described determined differential dimension direct discrete domain eigenfunctions eigenvalues elements English equal equation estimate example exists factor field finite fixed formula function given gives graph implies independent inequality integral introduce invariant lattice Lemma limit linear manifolds Math Mathematical matrix measure method Moreover observe obtain operator orbits particular periodic perturbation Phys positive potential present problem Proof properties Proposition prove quantum relation Remark representations respect restriction result satisfies similar smooth solutions space spectral spectrum statement Subsection sufficiently surface symbol Theorem theory transformation transl unique values vector