Linear Operators, Part 2 |
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Page 970
If Xe denotes the characteristic function of the set e in E , and if f is in L2 ( R ) ,
then Xef is in Ly ( R ) , L ( R ) and f is the limit in the norm of L2 ( R ) of the
generalized sequence { Xef } . Hence , by Theorem 9 , tf is the limit in the norm of
L ( M ) of ...
If Xe denotes the characteristic function of the set e in E , and if f is in L2 ( R ) ,
then Xef is in Ly ( R ) , L ( R ) and f is the limit in the norm of L2 ( R ) of the
generalized sequence { Xef } . Hence , by Theorem 9 , tf is the limit in the norm of
L ( M ) of ...
Page 1124
Hence ( Exn | 2 = E , x , for each n , so that Exn = EzXn and E = E . That is , Q ( E )
= 4 ( E ) implies E = E . Similarly , Q ( E ) S Q ( E ) implies E s Eq . If En . E are in F
and ( En ) increases to the limit ( E ) , then it follows from what we have already ...
Hence ( Exn | 2 = E , x , for each n , so that Exn = EzXn and E = E . That is , Q ( E )
= 4 ( E ) implies E = E . Similarly , Q ( E ) S Q ( E ) implies E s Eq . If En . E are in F
and ( En ) increases to the limit ( E ) , then it follows from what we have already ...
Page 1129
Thus E ( e ) is the strong limit of the operators Om . On the other hand , it follows
from Theorem X . 2 . 1 that Om belongs to the algebra A , so that is a limit of linear
combinations of products of the operators E . Since the projections E ; form a ...
Thus E ( e ) is the strong limit of the operators Om . On the other hand , it follows
from Theorem X . 2 . 1 that Om belongs to the algebra A , so that is a limit of linear
combinations of products of the operators E . Since the projections E ; form a ...
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Contents
BAlgebras | 859 |
Commutative BAlgebras | 868 |
Commutative BAlgebras | 874 |
Copyright | |
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additive adjoint operator algebra Amer analytic assume Banach spaces basis belongs Borel boundary conditions boundary values bounded called clear closed closure coefficients compact complex Consequently constant contains continuous converges Corollary corresponding defined Definition denote dense derivatives determined domain eigenvalues element equal equation essential spectrum evident Exercise exists extension finite follows formal differential operator formula function give given Hence Hilbert space identity independent indices inequality integral interval Lemma limit linear mapping Math matrix measure multiplicity neighborhood norm obtained partial positive preceding present problem projection proof properties prove range regular remark representation respectively restriction result satisfies seen sequence shown singular solution spectral square-integrable statement subset subspace sufficiently Suppose symmetric Theorem theory topology transform unique vanishes vector zero
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Bibliographic information
| Title | Linear Operators, Part 2 Linear Operators, Jacob T. Schwartz Volume 7 of Pure and applied mathematics Issue 7 of Pure and applied mathematics; a series of monographs and textbooks |
| Authors | Nelson Dunford, Jacob T. Schwartz |
| Publisher | Interscience Publishers, 1963 |
| Original from | the University of Michigan |
| Digitized | 20 Nov 2007 |
| ISBN | 0471226386, 9780471226383 |
| Length | 2592 pages |
| Export Citation | BiBTeX EndNote RefMan |