## Linear Operators: General theory |

### From inside the book

Results 1-3 of 81

Page 28

If f is a generalized Cauchy sequence in a complete metric space X , there

a pe X such that lim f ( d ) = p . Proof . Let dn e D be such that c , ca 2 dn implies g

( ( ci ) , f ( cz ) ) < 1 / n . Let bn be an upper bound for the finite set { dj , d , , . . .

If f is a generalized Cauchy sequence in a complete metric space X , there

**exists**a pe X such that lim f ( d ) = p . Proof . Let dn e D be such that c , ca 2 dn implies g

( ( ci ) , f ( cz ) ) < 1 / n . Let bn be an upper bound for the finite set { dj , d , , . . .

Page 292

Let E , be the family of all sets E in E for which lim un ( EF )

and let Eg be the family of all sets E n + 00 in E , for which EF € Ł , for each FeŁ .

It is clear that if F , and F are elements of Ez , then F _ F , € Łg . It is also clear that

if ...

Let E , be the family of all sets E in E for which lim un ( EF )

**exists**for each Fey ,and let Eg be the family of all sets E n + 00 in E , for which EF € Ł , for each FeŁ .

It is clear that if F , and F are elements of Ez , then F _ F , € Łg . It is also clear that

if ...

Page 362

Under the hypotheses of Exercise 37 , show that there

) & n ( x ) dx if and only if the functions pour homnanon ( e ) , m 2 1 , are uniformly

bounded and equicontinuous . 39 Let { an } , – 00 < n < + 00 , be a bounded ...

Under the hypotheses of Exercise 37 , show that there

**exists**f in C with an = * ( 2) & n ( x ) dx if and only if the functions pour homnanon ( e ) , m 2 1 , are uniformly

bounded and equicontinuous . 39 Let { an } , – 00 < n < + 00 , be a bounded ...

### What people are saying - Write a review

We haven't found any reviews in the usual places.

### Contents

Preliminary Concepts | 1 |

B Topological Preliminaries | 10 |

Algebraic Preliminaries | 34 |

Copyright | |

31 other sections not shown

### Other editions - View all

### Common terms and phrases

algebra Amer analytic applied arbitrary assumed B-space Banach spaces bounded called clear closed compact operator complex condition Consequently constant contains continuous functions converges convex convex set Corollary countably additive defined DEFINITION denote dense determined differential dimensional disjoint domain element equation equivalent everywhere Exercise exists extension field finite follows formula function defined function f given Hence Hilbert space identity implies inequality integral interval Lebesgue Lemma limit linear functional linear operator linear space Math neighborhood norm operator operator topology problem projection PROOF properties proved range reflexive representation respect satisfies scalar seen semi-group separable sequence set function Show shown statement subset subspace sufficient Suppose Theorem theory topology u-measurable uniform uniformly unique unit sphere valued vector weak weakly compact zero