Linear Operators: Spectral Theory : Self Adjoint Operators in Hilbert Space, Volume 2 |
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Page 1951
Let T belong to the right ( left ) ideal Jin B ( X ) . Then every projection E ( 0 ) with
0 € ö belongs to J . If J is closed , then S and N also belong to J . PROOF . Let 0 €
ō and let To = TE ( 0 ) | E ( o ) X , the restriction of T to the invariant subspace E ...
Let T belong to the right ( left ) ideal Jin B ( X ) . Then every projection E ( 0 ) with
0 € ö belongs to J . If J is closed , then S and N also belong to J . PROOF . Let 0 €
ō and let To = TE ( 0 ) | E ( o ) X , the restriction of T to the invariant subspace E ...
Page 2264
then I belongs neither to the point nor to the residual spectrum of S . Using the
formula for the spectral resolution of S given by the preceding theorem , we find
that E ( { 2 } ) = 0 for 1 # vo , deo ; thus , each such , must belong to the
continuous ...
then I belongs neither to the point nor to the residual spectrum of S . Using the
formula for the spectral resolution of S given by the preceding theorem , we find
that E ( { 2 } ) = 0 for 1 # vo , deo ; thus , each such , must belong to the
continuous ...
Page 2462
Moreover , if C belongs to the trace class C1 , then T , C converges to zero in
trace norm , and CT * converges to zero in trace norm . PROOF . The set K = C ( {
xe H | 1 } ) is conditionally compact , and thus for each € > 0 there exists a finite
set ...
Moreover , if C belongs to the trace class C1 , then T , C converges to zero in
trace norm , and CT * converges to zero in trace norm . PROOF . The set K = C ( {
xe H | 1 } ) is conditionally compact , and thus for each € > 0 there exists a finite
set ...
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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 |