This monograph, for the first time in book form, considers the large structure of metric spaces as captured by bornologies: families of subsets that contain the singletons, that are stable under finite unions, and that are stable under taking subsets of its members. The largest bornology is the power set of the space and the smallest is the bornology of its finite subsets. Between these lie (among others) the metrically bounded subsets, the relatively compact subsets, the totally bounded subsets, and the Bourbaki bounded subsets.
Classes of functions are intimately connected to various bornologies; e.g., (1) a function is locally Lipschitz if and only if its restriction to each relatively compact subset is Lipschitz; (2) a subset is Bourbaki bounded if and only if each uniformly continuous function on the space is bounded when restricted to the subset. A great deal of attention is given to the variational notions of strong uniform continuity and strong uniform convergence with respect to the members of a bornology, leading to the bornology of UC-subsets and UC-spaces. Spaces on which its uniformly continuous real-valued functions are stable under pointwise product are characterized in terms of the coincidence of the Bourbaki bounded subsets with a usually larger bornology.
Special attention is given to Lipschitz and locally Lipschitz functions. For example, uniformly dense subclasses of locally Lipschitz functions within the real-valued continuous functions, Cauchy continuous functions, and uniformly continuous functions are presented. It is shown very generally that a function between metric spaces has a particular metric property if and only if whenever it is followed in a composition by a real-valued Lipschitz function, the composition has the property. Bornological convergence of nets of closed subsets, having Attouch-Wets convergence as a prototype, is considered in detail. Topologies of uniform convergence for continuous linear operators between normed spaces is explained in terms of the bornological convergence of their graphs. Finally, the idea of a bornological extension of a topological space is presented, and all regular extensions can be so realized.
Bornologies are a useful tool in studying problems in mathematical analysis and general topology. For example, they can be used to characterize those metric spaces on which the real-valued uniformly continuous functions are stable under pointwise products.
| Preface |
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iii | |
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vii | |
| Introduction |
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1 | (4) |
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5 | (9) |
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2 Continuous Functions on Metric Spaces |
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14 | (7) |
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3 Extension of Real-Valued Continuous Functions on Subsets of a Metric Space |
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21 | (6) |
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4 The Lipschitz Norm for the Vector Space of Lipschitz Real-Valued Functions |
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27 | (6) |
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33 | (3) |
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36 | (6) |
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7 Total Boundedness Revisited and Bourbaki Boundedness |
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42 | (6) |
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8 Locally Lipschitz Functions |
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48 | (6) |
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9 Common Sets of Boundedness for Classes of Continuous Functions |
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54 | (4) |
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10 Hejcman's Theorem and its Analog for Totally Bounded Subsets |
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58 | (3) |
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61 | (4) |
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12 Properties of Bomologies |
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65 | (7) |
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13 Approximation by Members of a Bornology |
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72 | (7) |
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14 Selected Topological Properties of the One-Point Extension |
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79 | (4) |
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15 Bomologies of Metrically Bounded Sets |
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83 | (6) |
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16 Bomologies of Totally Bounded Sets |
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89 | (4) |
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17 Strong Uniform Continuity |
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93 | (7) |
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100 | (4) |
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104 | (8) |
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20 Pointwise Products of Uniformly Continuous Real-Valued Functions |
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112 | (7) |
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21 Strong Uniform Convergence on Bomologies |
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119 | (5) |
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22 Uniform Convergence on Totally Bounded Subsets |
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124 | (4) |
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23 Where Must Each Member of a Class of Locally Lipschitz Functions be Lipschitz? |
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128 | (7) |
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24 Real-Valued Lipschitz Functions and Classes of Locally Lipschitz Functions |
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135 | (4) |
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25 Metrically Convex Spaces and Coarse Maps |
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139 | (5) |
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144 | (7) |
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27 More on our Four Classes of Locally Lipschitz Functions |
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151 | (6) |
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28 Real-Valued Functionals and Bomologies |
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157 | (9) |
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29 Uniformly Paracompact Subsets |
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166 | (6) |
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30 Uniformly Paracompact Spaces and Uniformly Locally Lipschitz Functions |
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172 | (6) |
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31 Bornological Convergence of Nets of Closed Subsets |
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178 | (4) |
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32 Attouch-Wets Convergence |
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182 | (3) |
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33 Topologies of Uniform Convergence on B (X, Y) and Convergence of Graphs |
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185 | (6) |
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34 Bornological Convergence and Uniform Convergence of Distance Functional |
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191 | (6) |
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35 Bornological Convergence with Respect to the Compact Bornology |
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197 | (3) |
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36 When is Bornological Convergence Topological? |
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200 | (4) |
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37 Uniformizability and Metrizability |
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204 | (4) |
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38 Ideals, Bomologies and Extensions |
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208 | (7) |
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39 When is an Extension Bornological? |
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215 | (6) |
| References |
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221 | (6) |
| Index |
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227 | |
Gerald Beer, PhD UCLA 1971 won the faculty prize for teaching assistants at UCLA. He was a full professor at California State University Los Angeles, where he won the Presidents Distinguished Professor Award. He has around 140 papers in refereed journals plus two books: (1) Applied Calculus for Business and Economics; (2) Topologies on Closed and Closed Convex Sets. He is on the editorial boards of The Journal of Convex Analysis and Set-Valued and Variational Analysis. In 1983-1984, he was a Fulbright Professor associated with the Mathematical Consortium of Manila, and in 1986, he was a National Academy of Sciences exchange scholar at the Bulgarian Academy of Sciences. He had visiting positions at the University of California, Davis, University of Minnesota, University of Milan, University of Salerno, University of Naples II, University of Limoges, University of Montpellier II, University of Perpignan, University of Complutense Madrid, Politecnica Valencia, UMH Elche, and Auckland Institute of Technology. A conference honoring Professor Beer was held in Varenna, Lake Como, Italy on his 65th birthday.
