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- Duffin–Schaeffer_conjecture abstract "The Duffin–Schaeffer conjecture is an important conjecture in metric number theory proposed by R. J. Duffin and A. C. Schaeffer in 1941. It states that if is a real-valued function taking on positive values, then for almost all (with respect to Lebesgue measure), the inequality has infinitely many solutions in co-prime integers with if and only if the sum Here is the Euler totient function.The full conjecture remains unsolved. However, a higher-dimensional analogue of this conjecture has been resolved.".
- Duffin–Schaeffer_conjecture wikiPageID "31255149".
- Duffin–Schaeffer_conjecture wikiPageRevisionID "603813529".
- Duffin–Schaeffer_conjecture subject Category:Conjectures.
- Duffin–Schaeffer_conjecture subject Category:Diophantine_approximation.
- Duffin–Schaeffer_conjecture comment "The Duffin–Schaeffer conjecture is an important conjecture in metric number theory proposed by R. J. Duffin and A. C. Schaeffer in 1941. It states that if is a real-valued function taking on positive values, then for almost all (with respect to Lebesgue measure), the inequality has infinitely many solutions in co-prime integers with if and only if the sum Here is the Euler totient function.The full conjecture remains unsolved.".
- Duffin–Schaeffer_conjecture label "Duffin–Schaeffer conjecture".
- Duffin–Schaeffer_conjecture sameAs Duffin%E2%80%93Schaeffer_conjecture.
- Duffin–Schaeffer_conjecture sameAs Q5312375.
- Duffin–Schaeffer_conjecture sameAs Q5312375.
- Duffin–Schaeffer_conjecture wasDerivedFrom Duffin–Schaeffer_conjecture?oldid=603813529.