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Relatively Uniform Convergence of Sequences of Functions
You can always find the topics here!Topics: Mathematical functions, Mathematical theorems, Mathematical intervals, Uniformity, Continuous functions, Real variables, Integers, Mathematical sequences, Mathematical sets, Perceptron convergence procedure
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Notes and References
This item contains 9 references.
†An Introduction to a Form of General Analysis, The New Haven Mathematical Colloquium, Yale University Press, New Haven, 1910.
‡I. G. A., p. 27
§I. G. A., p. 33
‡This reference contains 2 citations:
- W. H. Young, Proceedings of the London Mathematical Society, ser. 2, vol. I (1903-4) p. 91
- E. W. Hobson, Theory of Functions of a Real Variable, Cambridge University Press, p. 474, ? 342; p. 484, ? 349.
*I. G. A., p. 87.
*This reference contains 2 citations:
- W. H. Young, Proceedings of the London Mathematical So- ciety, Ser. 2, vol. I (1903-4), p. 94
- E. W. Hobson, Theory of Functions of a Real Variable, p. 487.
†Non-Uniform Convergence and the Integration of Series Term by Term, American Jour- nal of Mathematics, vol. 19 (1897), p. 168.
*Osgood, loc. cit., p. 171.
†Hobson, loc. cit., p. 484, § 349.