| 21. | The uniform norm defines the topology of uniform convergence of functions on " X ".
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| 22. | The uniform structures allow one to talk about notions such as uniform continuity and uniform convergence on topological groups.
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| 23. | A central goal in designing a consistent, using the uniform convergence properties of empirical quantities to their means.
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| 24. | The situation is rather bad for equidistant nodes, in that uniform convergence is not even guaranteed for infinitely differentiable functions.
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| 25. | His dissertation, " On Uniform Convergence of Families of Sequences of Random Variables ", was written under Michel Lo�ve.
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| 26. | Uniform convergence implies both local uniform convergence and compact convergence, since both are local notions while uniform convergence is global.
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| 27. | Uniform convergence implies both local uniform convergence and compact convergence, since both are local notions while uniform convergence is global.
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| 28. | Uniform convergence implies both local uniform convergence and compact convergence, since both are local notions while uniform convergence is global.
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| 29. | So, first of all how do we conclude that the topology is simply the product / local uniform convergence topology?
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| 30. | Let \ partial G act as a discrete uniform convergence group on a compact metrizable space M with no isolated points.
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