St. Petersburg Mathematical Journal, 11. cilt,543-1121. sayfalarAmerican Mathematical Society, 2000 |
Kitabın içinden
91 sonuçtan 1-3 arası sonuçlar
Sayfa 602
Proposition 7. Let J be a Jordan ☀ - algebra , let A be a subalgebra generated by a , b Є J , and let r = ab - ba . Suppose that A2 = 0. Then the couple ( J , A , ) is a Jordan D - bialgebra . Proof . Since A is an algebra with zero ...
Proposition 7. Let J be a Jordan ☀ - algebra , let A be a subalgebra generated by a , b Є J , and let r = ab - ba . Suppose that A2 = 0. Then the couple ( J , A , ) is a Jordan D - bialgebra . Proof . Since A is an algebra with zero ...
Sayfa 605
... algebra Dn we can define a nondegenerate bilinear associative form F such that F ( xeij , yeji ) = f ( x , y ) for any x , y ED and any i , j . Let hЄ J. Then h = Σij hij [ ij ] and Q ( h , 1 ) Σ ; Q ( hii [ ii ] , { [ ii ] ...
... algebra Dn we can define a nondegenerate bilinear associative form F such that F ( xeij , yeji ) = f ( x , y ) for any x , y ED and any i , j . Let hЄ J. Then h = Σij hij [ ij ] and Q ( h , 1 ) Σ ; Q ( hii [ ii ] , { [ ii ] ...
Sayfa 606
... algebra B1 relative to the idempotents U1 , U2 , u3 . For any two different couples of indices i , j and k , l we have Q ( B1lij , Bıkt ) Q ( Blij Blii , Bikl ) Q ( Blij , Bli Bikt ) = 0 because the form Q is associative . In the space ...
... algebra B1 relative to the idempotents U1 , U2 , u3 . For any two different couples of indices i , j and k , l we have Q ( B1lij , Bıkt ) Q ( Blij Blii , Bikl ) Q ( Blij , Bli Bikt ) = 0 because the form Q is associative . In the space ...
İçindekiler
N Berestovskii and V M Gichev Metrized left invariant orders | 543 |
A A Glutsyuk Codimension of the set of onedimensional polynomial | 567 |
N Zhelyabin On a class of Jordan Dbialgebras | 589 |
Telif Hakkı | |
16 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
3-manifold A₁ acyclic affine space affine variety algebra assume automorphism B₁ bialgebra birationally equivalent C*-action c₁ Calabi-Yau manifolds codimension coefficients commutative compact component condition construction contains Corollary corresponding cosets curve defined Definition deformation degree denote diffeomorphic divisor element elliptic genus embedding English transl equation Euler Euler characteristic exists fiber field finite formula function fundamental group group G H₁ harmonic Hecke operators holomorphic homotopy hyperbolic hypersurface immersions implies inequality integral intersection invariant irreducible isomorphic Jacobi forms Lemma Let F linear m₁ manifold Math Mathematical matrix modular forms module monodromy neighborhood notation obtain problem proof of Theorem Proposition prove relation Remark respectively ring satisfies Seifert semigroup sequence singular points smooth space subgroup submanifold Subsection subspace surface t₁ topological trivial unramified vector polynomial whence zero