## Linear Operators: Spectral theory |

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Page 1529

The confluent hypergeometric

The confluent hypergeometric

**equation**has the characteristic**equation**a ? — = 0 , so that $ 11 ) = 0 , $ 2 ) = 1. Thus the Stokes lines for this**equation**are the positive and negative imaginary axes . Trying solutions of the form 2-1 ...Page 1553

G3 Suppose that the operator t has the property that for some 2 the derivative of every square - integrable solution of the

G3 Suppose that the operator t has the property that for some 2 the derivative of every square - integrable solution of the

**equation**( 4-1 ) } = 0 is bounded . Prove that t has no boundary values at infinity .Page 1556

What is the relationship between 0 ( t ) and the number of zeros of a solution of the above

What is the relationship between 0 ( t ) and the number of zeros of a solution of the above

**equation**? G14 Use the result of the preceding exercise to show that if the operator t has two boundary values at infinity , then N ( t ) lim ...### What people are saying - Write a review

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### Contents

BAlgebras | 859 |

Miscellaneous Applications | 937 |

Compact Groups | 945 |

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