St. Petersburg Mathematical Journal, 18. cilt,1-510. sayfalarAmerican Mathematical Society, 2007 |
Kitabın içinden
37 sonuçtan 1-3 arası sonuçlar
Sayfa 160
... subspace { C } + Ge is a maximal positive subspace in G1 ( = Go ) . Here { C } is the subspace of constant functions . Proof . ( a ) If Ø is not an integer , then Ge is a Krein space and , clearly , GA is a closed positive subspace ...
... subspace { C } + Ge is a maximal positive subspace in G1 ( = Go ) . Here { C } is the subspace of constant functions . Proof . ( a ) If Ø is not an integer , then Ge is a Krein space and , clearly , GA is a closed positive subspace ...
Sayfa 226
... subspace in Fn . We put ß i = 1 V1 = { ß € ( Fn ) : ẞ ( a ) = 0 , a € V } . Let r , s , tЄ Z + . We denote by Mall ( respectively , by Mn , all ) , where ne Z + and n≥r + s + t , the set of all pairs of subspaces ( V , V ' ) such that ...
... subspace in Fn . We put ß i = 1 V1 = { ß € ( Fn ) : ẞ ( a ) = 0 , a € V } . Let r , s , tЄ Z + . We denote by Mall ( respectively , by Mn , all ) , where ne Z + and n≥r + s + t , the set of all pairs of subspaces ( V , V ' ) such that ...
Sayfa 228
... subspace Hv ′ = { ƒ € F : ƒ ( p ) = 0 for all p ‡ ( V , V ' ) } . For an arbitrary matrix g € G ( ∞ ) , we have T ( g ) PV'T ( g ̄1 ) = PV'9 ̄ gV Since the action of the group G ( ∞ ) on M is transitive , we see that , for each pair ...
... subspace Hv ′ = { ƒ € F : ƒ ( p ) = 0 for all p ‡ ( V , V ' ) } . For an arbitrary matrix g € G ( ∞ ) , we have T ( g ) PV'T ( g ̄1 ) = PV'9 ̄ gV Since the action of the group G ( ∞ ) on M is transitive , we see that , for each pair ...
İçindekiler
Auckly L Kapitanski and J M Speight Geometry and analysis | 1 |
R W Barnard C Richardson and A Yu Solynin A minimal area problem | 21 |
Generalov Hochschild cohomology of algebras of quaternion type | 37 |
Telif Hakkı | |
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