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

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Page 1310

Then the boundary conditions are real , and there is exactly one solution q ( t , 2 )

of ( T - 219 = 0

a , and exactly one solution y ( t , 2 ) of ( T - 2 ) = 0

Then the boundary conditions are real , and there is exactly one solution q ( t , 2 )

of ( T - 219 = 0

**square**-**integrable**at a and satisfying the boundary conditions ata , and exactly one solution y ( t , 2 ) of ( T - 2 ) = 0

**square**-**integrable**at b and ...Page 1329

Let In +0 . Then the boundary conditions are real , and there is exactly one

solution q ( t , 2 ) of ( 1-2 ) = 0

conditions at a , and exactly one solution y ( t , 2 ) of ( T - 1 ) 0 = 0

Let In +0 . Then the boundary conditions are real , and there is exactly one

solution q ( t , 2 ) of ( 1-2 ) = 0

**square**-**integrable**at a and satisfying the boundaryconditions at a , and exactly one solution y ( t , 2 ) of ( T - 1 ) 0 = 0

**squareintegrable**at ...Page 1416

( b ) By Theorem 11 , it will suffice to show that every solution of the equation to =

0 is

solution of the equation [ ** o ' - kt - 20 ( 0 < k < 1 ) . Let ta be subjected to the

boundary ...

( b ) By Theorem 11 , it will suffice to show that every solution of the equation to =

0 is

**square**-**integrable**. Let | be a real solution of this equation . Let t2 be asolution of the equation [ ** o ' - kt - 20 ( 0 < k < 1 ) . Let ta be subjected to the

boundary ...

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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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