St. Petersburg Mathematical Journal, 12. cilt,1-505. sayfalarAmerican Mathematical Society, 2001 |
Kitabın içinden
68 sonuçtan 1-3 arası sonuçlar
Sayfa 85
... invariant subspaces of X with those of X1 . As- suming that I is a multiplier invariant subspace of X1 subject to some conditions ( to be fixed later ) , we define I. M ( X ) = span { ƒ ¢ : ƒ € I , ¢ € M ( X ) } , where by the span of a ...
... invariant subspaces of X with those of X1 . As- suming that I is a multiplier invariant subspace of X1 subject to some conditions ( to be fixed later ) , we define I. M ( X ) = span { ƒ ¢ : ƒ € I , ¢ € M ( X ) } , where by the span of a ...
Sayfa 96
... invariant subspace of X of index 1 , and let E be as in the preceding lemma . Then in X there exist two multiplier invariant subspaces J1 and J2 such that ( a ) J = JinJ2 , ( b ) σ , σE , ( c ) σJ2 = 0JE . = = Proof . First , we assume ...
... invariant subspace of X of index 1 , and let E be as in the preceding lemma . Then in X there exist two multiplier invariant subspaces J1 and J2 such that ( a ) J = JinJ2 , ( b ) σ , σE , ( c ) σJ2 = 0JE . = = Proof . First , we assume ...
Sayfa 99
... invariant subspaces JCX with oJ C1 . As was observed in Lemma 4.6 , any multiplier invariant subspace JC X of index 1 splits : J J Ո Ս . with JS and J2 € 6. By Theorem 4.8 , J1 corresponds to I1 = J1n X1 , and J2 corresponds to I2 ...
... invariant subspaces JCX with oJ C1 . As was observed in Lemma 4.6 , any multiplier invariant subspace JC X of index 1 splits : J J Ո Ս . with JS and J2 € 6. By Theorem 4.8 , J1 corresponds to I1 = J1n X1 , and J2 corresponds to I2 ...
İçindekiler
2000 вып 1 Vol 12 2001 No | 2 |
Cohomology of isotropic flag varieties | 19 |
10 Varieties of ideals | 28 |
Telif Hakkı | |
4 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
algebra analytic apply assume asymptotic Banach space basis belongs boundary bounded called coefficients coincides commutative complete component condition configuration Consequently consider construct contains continuous convergence corresponding cubes defined definition denote determined diagram direct domain eigenvalues elements entire equal equation equivalent estimate exists extension fact field finite fixed formal formula function geometry given homomorphism identity implies inequality integral introduce invariant involution isomorphism journals Lemma linear Math Mathematical matrix means module Moreover multiplication natural norm obtain operator particular polynomial positive problem projection Proof properties Proposition prove proximate order quadratic relation relative Remark representation respectively restriction result ring satisfies sequence similar smooth solution space statement Subsection subspace Suppose Theorem theory variety vector