## Linear Operators: Self Adjoint Operators in Hilbert Space. Spectral theory. Part II |

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Page 1343

Thus E ( M ( 2 ) ; U ) is non - zero for a near do , a € Oo , and it follows that for a

number of distinct points in the spectrum of M ( a ) , the sets { 2 € o ln ( ) Z s } are ...

Thus E ( M ( 2 ) ; U ) is non - zero for a near do , a € Oo , and it follows that for a

**sufficiently**close to 20 , o ( M ( 2 ) ) U is non - void . Thus if n ( a ) denotes thenumber of distinct points in the spectrum of M ( a ) , the sets { 2 € o ln ( ) Z s } are ...

Page 1450

Self Adjoint Operators in Hilbert Space. Spectral theory. Part II Nelson Dunford,

Jacob T. Schwartz. q ' ( t ) ( g ( t ) ' ) 2 $ .04 1 602 ) - dt • đo 19 ( t ) / 3 / 2 19 ( t ) | 5/

2 for

...

Self Adjoint Operators in Hilbert Space. Spectral theory. Part II Nelson Dunford,

Jacob T. Schwartz. q ' ( t ) ( g ( t ) ' ) 2 $ .04 1 602 ) - dt • đo 19 ( t ) / 3 / 2 19 ( t ) | 5/

2 for

**sufficiently**small bo , and if S * ig ( e ) - de < 60 for**sufficiently**small bo , then...

Page 1760

... is bounded and of norm at most Mz . We shall show that ( vii ) for each k 20 ,

and for each

dense in Ê ! ( C ) . Suppose that ( v ) is false , but that ( vii ) has been established .

... is bounded and of norm at most Mz . We shall show that ( vii ) for each k 20 ,

and for each

**sufficiently**small positive a Sa ( k ) , the mapping 1- « S has a rangedense in Ê ! ( C ) . Suppose that ( v ) is false , but that ( vii ) has been established .

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### Contents

SPECTRAL THEORY Self Adjoint Operators in Hilbert Space | 858 |

BAlgebras | 859 |

Preliminary Notions | 865 |

Copyright | |

61 other sections not shown

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additive Akad 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 determined domain eigenvalues element equal equation essential spectrum evident Exercise exists extension finite follows formal differential operator formula function function f given Hence Hilbert space identity independent indices inequality integral interval Lemma limit linear mapping Math matrix measure multiplicity Nauk neighborhood norm obtained partial positive preceding present problem projection proof properties prove range regular remark representation respectively restriction result satisfies seen sequence singular solution spectral square-integrable statement subset subspace sufficiently Suppose symmetric Theorem theory topology transform unique vanishes vector zero