## Linear Operators: General theory |

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Page 40

For if I is maximal , then RȚI is a commutative ring with

For if I is maximal , then RȚI is a commutative ring with

**unit**which has no proper ideals ; by what we showed earlier RI is a field .Page 41

Further , from the above we see that if M is a maximal ideal in a Boolean ring R with

Further , from the above we see that if M is a maximal ideal in a Boolean ring R with

**unit**, then RM is isomorphic with the field 02 .Page 485

Since the closed

Since the closed

**unit**sphere S * of Y * is y - compact ( V.4.2 ) , it follows from Lemma 7 and Lemma 1.5.7 that T * S * is compact in the X ** topology of X ...### What people are saying - Write a review

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### Contents

Preliminary Concepts | 1 |

The VitaliHahnSaks Theorem and Spaces of Measures | 7 |

B Topological Preliminaries | 10 |

Copyright | |

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