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A Metrical Theorem in Diophantine Approximation

Published online by Cambridge University Press:  20 November 2018

Wolfgang Schmidt*
Affiliation:
Montana State University
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In this paper we prove a sharpening and generalization of the following Theorem of Khintchine (4):

Let ψ1(q), …, ψnq) be n non-negative junctions of the positive integer q and assume

is monotonically decreasing. Then the set of inequalities

1

has an infinity of integer solutions q > 0 and p1, … , pn for almost all or no sets of numbers θ1, … , θ2, according as Σψ(q) diverges or converges.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1960

References

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3. Cassels, J.W.S.,An introduction to diophantine approximation, Cambridge Tracts, 45 (1957).Google Scholar
4. Khintchine, A., Zur metrischen Théorie der diophantischen Approximationen, Math. Z., 24 (1926), 706714.Google Scholar
5. Schmidt, W., A metrical theorem in geometry ojnumbers, Trans. Amer. Math. Soc, 00 (1960), 000000.Google Scholar