## Linear Operators: Spectral theory |

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Page 1036

Then the infinite product 8 ( T ) = } ( 1 - 1 ) er

analytic for a + 0 . For each fixed a + 0 , 8 ( T ) is a continuous complex valued

function on the B - space of all Hilbert - Schmidt operators . PROOF . First note

that if ...

Then the infinite product 8 ( T ) = } ( 1 - 1 ) er

**converges**and defines a functionanalytic for a + 0 . For each fixed a + 0 , 8 ( T ) is a continuous complex valued

function on the B - space of all Hilbert - Schmidt operators . PROOF . First note

that if ...

Page 1333

Since gn + 0 and TR ( 2 ; T ) is a bounded operator , it follows that R ( 2 ; T ) gn

and TR ( 1 ; T ) gn

( 4 , 9 : 19 ;

of ...

Since gn + 0 and TR ( 2 ; T ) is a bounded operator , it follows that R ( 2 ; T ) gn

and TR ( 1 ; T ) gn

**converge**to zero in L ( I ) . Thus by Lemma 2 . 16 the series on( 4 , 9 : 19 ;

**converges**to f in the topology of Cn - ( J ) for each compact interval Jof ...

Page 1436

Let { gn } be a bounded sequence of elements of D ( T ) such that { Tgn }

each j , 1 si sk . Then hi = h ; - * - * * ( hi ) ; is in D , and Tħ ; = Thị . Thus { ħi }

Let { gn } be a bounded sequence of elements of D ( T ) such that { Tgn }

**converges**. Find a subsequence { & n , } = { hi } such that x * ( hi )**converges**foreach j , 1 si sk . Then hi = h ; - * - * * ( hi ) ; is in D , and Tħ ; = Thị . Thus { ħi }

**converges**...### What people are saying - Write a review

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### Contents

BAlgebras | 859 |

Bounded Normal Operators in Hilbert Space | 887 |

Miscellaneous Applications | 937 |

Copyright | |

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