Linear Operators: Spectral Theory : Self Adjoint Operators in Hilbert Space, Volume 2 |
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Page 2183
Moreover , P is evidently a projection in B . The set B is clearly a subalgebra of A
( T ) . Let B denote its closure in the uniform topology of operators . By Theorem
XV . 4 . 5 and the fact that a scalar type operator is clearly in the uniformly closed
...
Moreover , P is evidently a projection in B . The set B is clearly a subalgebra of A
( T ) . Let B denote its closure in the uniform topology of operators . By Theorem
XV . 4 . 5 and the fact that a scalar type operator is clearly in the uniformly closed
...
Page 2271
EEG and G * z * y = lim z * Ey = 0 , Ye M . EEG If we set y * = G * 2 * , then clearly
G and y * satisfy ( ii ) and ( iii ) . Let H = { Ely * Ex = y * x , X e M ( xo ) } . Clearly G
2 H . However , if y * Ex = y * x for all x e M ( x . ) , then z * GEx = y * Ex = y * x = F
...
EEG and G * z * y = lim z * Ey = 0 , Ye M . EEG If we set y * = G * 2 * , then clearly
G and y * satisfy ( ii ) and ( iii ) . Let H = { Ely * Ex = y * x , X e M ( xo ) } . Clearly G
2 H . However , if y * Ex = y * x for all x e M ( x . ) , then z * GEx = y * Ex = y * x = F
...
Page 2332
Theorem IV . 4 . 13 ) to obtain the desired result . If ß = - R ( Q ) > 0 , then we note
that lam ( $ 12 e - 2015 ( e ) del - 27B Hence , putting f ( t ) = 0 for t > 1 , and
making the change of variable 8 = – 27ßt , it is clearly sufficient for us to show that
for ...
Theorem IV . 4 . 13 ) to obtain the desired result . If ß = - R ( Q ) > 0 , then we note
that lam ( $ 12 e - 2015 ( e ) del - 27B Hence , putting f ( t ) = 0 for t > 1 , and
making the change of variable 8 = – 27ßt , it is clearly sufficient for us to show that
for ...
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Bibliographic information
| Title | Linear Operators: Spectral Theory : Self Adjoint Operators in Hilbert Space, Volume 2 Volume 7 of Pure and applied mathematics |
| Authors | Nelson Dunford, Jacob Theodore Schwartz |
| Publisher | Wiley Interscience, 1963 |
| Original from | the University of Michigan |
| Digitized | 2 Feb 2010 |
| ISBN | 0471226394, 9780471226390 |
| Length | 2592 pages |
| Export Citation | BiBTeX EndNote RefMan |