## Elements of Abstract AnalysisIn nature's infinite book ofsecrecy A little I can read. Antony and Cleopatra, l. ii. This is a book about a few elementary concepts of analysis and the mathe matical structures which enfold them. It is more concerned with the interplay amongst these concepts than with their many applications. The book is self-contained; in the first chapter, after acknowledging the fundamental role ofmathematical logic, wepresent seven axioms of Set Theory; everything else is developed from these axioms. It would therefore be true, if misleading, to say that the reader requires no prior knowledge of mathematics. In reality, the reader we have in mind has that level of sophistication achieved in about three years of undergraduate study of mathematics and is already well acquainted with most of the structures discussed-rings, linear spaces, metric spaces, and soon-and with many ofthe principal analytical concepts convergence, connectedness, continuity,compactness and completeness. Indeed, it is only after gaining familiarity with these concepts and their applications that it is possible to appreciate their place within a broad framework of set based mathematics and to consolidate an understanding of them in such a framework. To aid in these pursuits, wepresent our reader with things familiar and things new side by side in most parts of the book-and we sometimes adopt an unusual perspective. That this is not an analysis textbook is clear from its many omissions. |

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Pagina 6

The Axiom of Extensionality tells us that each set is fully and

The Axiom of Extensionality tells us that each set is fully and

**uniquely**determined by its elements; the term extensional is a technical term which refers to the property described by the axiom itself. Sets, however they are defined, ... Pagina 7

A functional condition p(x,y) associates with each set a either nothing at all or one specific set, namely the

A functional condition p(x,y) associates with each set a either nothing at all or one specific set, namely the

**unique**y such that p(x, y) holds. This looks rather like the action of a function whose domain consists of those a for which ... Pagina 8

Then the set a\a clearly has no members; Axiom I tells us that this empty set is

Then the set a\a clearly has no members; Axiom I tells us that this empty set is

**unique**, and the definition of subsets ensures that it is a subset of every set. Towards the second assertion, suppose z is a set and let y = {x e 2 | x 4 ... Pagina 9

Then there is a

Then there is a

**unique**set whose members are just a and b. Proof Let p(x, y) be the condition ((a = 2 and y = a) or (a = {2} and y = b)); this is a functional condition because {2} # 2 by Axiom I. By applying Axiom III to the set PP(Ø), ... Pagina 14

Definition 1.2.11 A set f is called a FUNCTION if and only if f is a relation and, for each a € dom(f), there exists a

Definition 1.2.11 A set f is called a FUNCTION if and only if f is a relation and, for each a € dom(f), there exists a

**unique**set y such that (x, y) € f. The**unique**y for which (x, y) e f is called the IMAGE of a under for the VALUE of ...### Ce spun oamenii - Scrie o recenzie

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### Cuprins

Counting | 41 |

Algebraic Structure | 57 |

Analytic Structure | 91 |

Linear Structure | 115 |

Geometric Structure | 133 |

Topological Structure | 159 |

Continuity and Openness | 177 |

Connectedness | 207 |

Convergence | 215 |

Compactness | 231 |

Completeness | 245 |

Solutions | 269 |

Bibliography | 285 |

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### Termeni și expresii frecvente

acc(A algebra arbitrary Axiom of Choice Banach bijective bounded called cardinal closed subset commutative compact space converges convex counting number defined Definition denoted dense disjoint dom(r domain endowed ensures equivalent Example EXERCISES Q exists f is continuous field F filter finite subset follows Hausdorff space Hilbert space homomorphism includes induction initial topology injective injective function intersection inverse isometric Lemma linear subspace linearly independent maximal subspace metric space nbd(x non-empty set non-empty subset non-trivial normed linear space notation oo U oo open ball open neighbourhood open subset order isomorphism ordered set ordinal Proof Let Proof Suppose ps(X quotient real numbers Recursive relative topology second countable semimetric space seminormed seminormed linear space Show spaces and f subbase Suppose f surjective topological space topology determined totally ordered ultrafilter union unique unit ball vector space whence